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	<h1 id="top">
	Iozone results for iwrite, data are arranged by file size
	</h1>
	<DL class="filelist"><DT><STRONG>Baseline data set</STRONG><UL><LI>./ext4/ext4_1.iozone<LI>./ext4/ext4_2.iozone<LI>./ext4/ext4_3.iozone<LI>./ext4/ext4_4.iozone<LI>./ext4/ext4_5.iozone</UL><DT><STRONG>Investigated data set</STRONG><UL><LI>./xfs/xfs1.iozone<LI>./xfs/xfs2.iozone<LI>./xfs/xfs3.iozone<LI>./xfs/xfs4.iozone<LI>./xfs/xfs5.iozone</UL></DL><p>mean => Arithmetic mean<br>standar dev. => Sample standard deviation<br>ci. max 90%, ci.min => confidence interval at confidence level 90% => it means that mean value of the distribution lies with 90% propability in interval ci_min-ci_max<br>geom. mean => Geometric mean<br>median => Second quartile = cuts data set in half = 50th percentile <br>first quartile => cuts off lowest 25% of data = 25th percentile <br>third quartile => cuts off highest 25% of data, or lowest 75% = 75th percentile <br>minimum => Lowest value of data set <br>maximum => Hightest value of data set <br>baseline set1 difference => Difference of medians of both sets in percennt. Arithmetic means are used in detail mode instead.<br>ttest p-value => Student's t-test p-value = probability the both data sets are equal <br>ttest equality => If p-value is higher than 0.1, data sets are considered being equal with 90% probability. Otherwise the data sets are considered being different.<br>Linear regression of all results regression line is in y = ax form, b coeficient is zero. </p><p>for details about operations performed see <a href="http://www.iozone.org/docs/IOzone_msword_98.pdf">Iozone documentation</a></p><a name="4"></a> 
<img src="4.png" alt="4" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="1">Block size [kB]</td>
</tr>
<tr><td>4</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>4</td><td>195.5</td></tr>
<tr><td>4</td><td>139.08</td></tr>
<tr><td>4</td><td>145.24</td></tr>
<tr><td>4</td><td>143.96</td></tr>
<tr><td>4</td><td>195.5</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>163.86</td>
</tr>
<tr>
<td>standard dev.</td>
<td>28.98</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>136.23</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>191.48</td>
</tr>
<tr>
<td>geom. mean</td>
<td>161.87</td>
</tr>
<tr>
<td>median</td>
<td>145.24</td>
</tr>
<tr>
<td>first quartile</td>
<td>143.96</td>
</tr>
<tr>
<td>third quartile</td>
<td>195.5</td>
</tr>
<tr>
<td>minimum</td>
<td>139.08</td>
</tr>
<tr>
<td>maximum</td>
<td>195.5</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>4</td><td>184.49</td></tr>
<tr><td>4</td><td>184.49</td></tr>
<tr><td>4</td><td>195.5</td></tr>
<tr><td>4</td><td>186.59</td></tr>
<tr><td>4</td><td>186.59</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>187.53</td>
</tr>
<tr>
<td>standard dev.</td>
<td>4.57</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>183.17</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>191.9</td>
</tr>
<tr>
<td>geom. mean</td>
<td>187.49</td>
</tr>
<tr>
<td>median</td>
<td>186.59</td>
</tr>
<tr>
<td>first quartile</td>
<td>184.49</td>
</tr>
<tr>
<td>third quartile</td>
<td>186.59</td>
</tr>
<tr>
<td>minimum</td>
<td>184.49</td>
</tr>
<tr>
<td>maximum</td>
<td>195.5</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>14.45 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.1088</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
</tr>
</table>
<a name="8"></a> 
<img src="8.png" alt="8" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="2">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>8</td><td>338.49</td><td>373.19</td></tr>
<tr><td>8</td><td>325.06</td><td>301.16</td></tr>
<tr><td>8</td><td>328.32</td><td>356.93</td></tr>
<tr><td>8</td><td>190.73</td><td>290.48</td></tr>
<tr><td>8</td><td>338.49</td><td>373.19</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>304.22</td>
<td>338.99</td>
</tr>
<tr>
<td>standard dev.</td>
<td>63.73</td>
<td>40.14</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>243.46</td>
<td>300.72</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>364.98</td>
<td>377.26</td>
</tr>
<tr>
<td>geom. mean</td>
<td>297.55</td>
<td>337.03</td>
</tr>
<tr>
<td>median</td>
<td>328.32</td>
<td>356.93</td>
</tr>
<tr>
<td>first quartile</td>
<td>325.06</td>
<td>301.16</td>
</tr>
<tr>
<td>third quartile</td>
<td>338.49</td>
<td>373.19</td>
</tr>
<tr>
<td>minimum</td>
<td>190.73</td>
<td>290.48</td>
</tr>
<tr>
<td>maximum</td>
<td>338.49</td>
<td>373.19</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>8</td><td>353.08</td><td>462.79</td></tr>
<tr><td>8</td><td>50.43</td><td>410.6</td></tr>
<tr><td>8</td><td>373.19</td><td>373.19</td></tr>
<tr><td>8</td><td>356.93</td><td>368.98</td></tr>
<tr><td>8</td><td>269.02</td><td>52.78</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>280.53</td>
<td>333.67</td>
</tr>
<tr>
<td>standard dev.</td>
<td>134.88</td>
<td>161.47</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>151.94</td>
<td>179.72</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>409.12</td>
<td>487.62</td>
</tr>
<tr>
<td>geom. mean</td>
<td>229.6</td>
<td>267.94</td>
</tr>
<tr>
<td>median</td>
<td>353.08</td>
<td>373.19</td>
</tr>
<tr>
<td>first quartile</td>
<td>269.02</td>
<td>368.98</td>
</tr>
<tr>
<td>third quartile</td>
<td>356.93</td>
<td>410.6</td>
</tr>
<tr>
<td>minimum</td>
<td>50.43</td>
<td>52.78</td>
</tr>
<tr>
<td>maximum</td>
<td>373.19</td>
<td>462.79</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-7.79 % </td>
<td>-1.57 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.7317</td>
<td>0.9447</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="16"></a> 
<img src="16.png" alt="16" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="3">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>16</td><td>501.02</td><td>556.31</td><td>596.84</td></tr>
<tr><td>16</td><td>520.93</td><td>538.04</td><td>556.31</td></tr>
<tr><td>16</td><td>504.88</td><td>538.04</td><td>580.96</td></tr>
<tr><td>16</td><td>354.62</td><td>96.55</td><td>381.45</td></tr>
<tr><td>16</td><td>520.93</td><td>423.34</td><td>434.57</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>480.48</td>
<td>430.45</td>
<td>510.03</td>
</tr>
<tr>
<td>standard dev.</td>
<td>70.94</td>
<td>193.99</td>
<td>96.09</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>412.84</td>
<td>245.5</td>
<td>418.41</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>548.11</td>
<td>615.4</td>
<td>601.64</td>
</tr>
<tr>
<td>geom. mean</td>
<td>475.63</td>
<td>366.16</td>
<td>502.3</td>
</tr>
<tr>
<td>median</td>
<td>504.88</td>
<td>538.04</td>
<td>556.31</td>
</tr>
<tr>
<td>first quartile</td>
<td>501.02</td>
<td>423.34</td>
<td>434.57</td>
</tr>
<tr>
<td>third quartile</td>
<td>520.93</td>
<td>538.04</td>
<td>580.96</td>
</tr>
<tr>
<td>minimum</td>
<td>354.62</td>
<td>96.55</td>
<td>381.45</td>
</tr>
<tr>
<td>maximum</td>
<td>520.93</td>
<td>556.31</td>
<td>596.84</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>16</td><td>556.31</td><td>602.32</td><td>625.31</td></tr>
<tr><td>16</td><td>486.15</td><td>602.32</td><td>602.32</td></tr>
<tr><td>16</td><td>381.45</td><td>556.31</td><td>625.31</td></tr>
<tr><td>16</td><td>504.88</td><td>602.32</td><td>625.31</td></tr>
<tr><td>16</td><td>504.88</td><td>520.93</td><td>602.32</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>486.73</td>
<td>576.84</td>
<td>616.11</td>
</tr>
<tr>
<td>standard dev.</td>
<td>64.39</td>
<td>37.07</td>
<td>12.59</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>425.35</td>
<td>541.5</td>
<td>604.11</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>548.12</td>
<td>612.18</td>
<td>628.12</td>
</tr>
<tr>
<td>geom. mean</td>
<td>483.04</td>
<td>575.86</td>
<td>616.01</td>
</tr>
<tr>
<td>median</td>
<td>504.88</td>
<td>602.32</td>
<td>625.31</td>
</tr>
<tr>
<td>first quartile</td>
<td>486.15</td>
<td>556.31</td>
<td>602.32</td>
</tr>
<tr>
<td>third quartile</td>
<td>504.88</td>
<td>602.32</td>
<td>625.31</td>
</tr>
<tr>
<td>minimum</td>
<td>381.45</td>
<td>520.93</td>
<td>602.32</td>
</tr>
<tr>
<td>maximum</td>
<td>556.31</td>
<td>602.32</td>
<td>625.31</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>1.3 % </td>
<td>34.01 % </td>
<td>20.8 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.8875</td>
<td>0.136</td>
<td>0.0401</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
</tr>
</table>
<a name="32"></a> 
<img src="32.png" alt="32" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="4">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>32</td><td>649.5</td><td>741.33</td><td>781.09</td><td>180.59</td></tr>
<tr><td>32</td><td>440.13</td><td>666.0</td><td>489.43</td><td>694.22</td></tr>
<tr><td>32</td><td>624.73</td><td>724.93</td><td>745.55</td><td>758.49</td></tr>
<tr><td>32</td><td>165.33</td><td>709.24</td><td>724.93</td><td>741.33</td></tr>
<tr><td>32</td><td>649.5</td><td>697.91</td><td>548.86</td><td>820.2</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>505.83</td>
<td>707.88</td>
<td>657.97</td>
<td>638.97</td>
</tr>
<tr>
<td>standard dev.</td>
<td>209.57</td>
<td>28.57</td>
<td>130.02</td>
<td>260.18</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>306.03</td>
<td>680.64</td>
<td>534.01</td>
<td>390.91</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>705.64</td>
<td>735.12</td>
<td>781.94</td>
<td>887.02</td>
</tr>
<tr>
<td>geom. mean</td>
<td>453.47</td>
<td>707.42</td>
<td>647.03</td>
<td>565.47</td>
</tr>
<tr>
<td>median</td>
<td>624.73</td>
<td>709.24</td>
<td>724.93</td>
<td>741.33</td>
</tr>
<tr>
<td>first quartile</td>
<td>440.13</td>
<td>697.91</td>
<td>548.86</td>
<td>694.22</td>
</tr>
<tr>
<td>third quartile</td>
<td>649.5</td>
<td>724.93</td>
<td>745.55</td>
<td>758.49</td>
</tr>
<tr>
<td>minimum</td>
<td>165.33</td>
<td>666.0</td>
<td>489.43</td>
<td>180.59</td>
</tr>
<tr>
<td>maximum</td>
<td>649.5</td>
<td>741.33</td>
<td>781.09</td>
<td>820.2</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>32</td><td>728.96</td><td>800.17</td><td>869.14</td><td>917.83</td></tr>
<tr><td>32</td><td>666.0</td><td>724.93</td><td>805.08</td><td>924.31</td></tr>
<tr><td>32</td><td>482.23</td><td>800.17</td><td>820.2</td><td>869.14</td></tr>
<tr><td>32</td><td>694.22</td><td>805.08</td><td>841.25</td><td>863.42</td></tr>
<tr><td>32</td><td>679.81</td><td>762.91</td><td>846.69</td><td>869.14</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>650.24</td>
<td>778.65</td>
<td>836.47</td>
<td>888.77</td>
</tr>
<tr>
<td>standard dev.</td>
<td>96.8</td>
<td>34.49</td>
<td>24.72</td>
<td>29.67</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>557.95</td>
<td>745.77</td>
<td>812.9</td>
<td>860.49</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>742.53</td>
<td>811.53</td>
<td>860.04</td>
<td>917.05</td>
</tr>
<tr>
<td>geom. mean</td>
<td>643.67</td>
<td>778.03</td>
<td>836.18</td>
<td>888.38</td>
</tr>
<tr>
<td>median</td>
<td>679.81</td>
<td>800.17</td>
<td>841.25</td>
<td>869.14</td>
</tr>
<tr>
<td>first quartile</td>
<td>666.0</td>
<td>762.91</td>
<td>820.2</td>
<td>869.14</td>
</tr>
<tr>
<td>third quartile</td>
<td>694.22</td>
<td>800.17</td>
<td>846.69</td>
<td>917.83</td>
</tr>
<tr>
<td>minimum</td>
<td>482.23</td>
<td>724.93</td>
<td>805.08</td>
<td>863.42</td>
</tr>
<tr>
<td>maximum</td>
<td>728.96</td>
<td>805.08</td>
<td>869.14</td>
<td>924.31</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>28.55 % </td>
<td>10.0 % </td>
<td>27.13 % </td>
<td>39.1 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.1994</td>
<td>0.0077</td>
<td>0.0167</td>
<td>0.0655</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="64"></a> 
<img src="64.png" alt="64" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="5">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>64</td><td>743.03</td><td>880.25</td><td>933.54</td><td>960.92</td><td>975.22</td></tr>
<tr><td>64</td><td>762.48</td><td>557.98</td><td>762.48</td><td>892.24</td><td>960.92</td></tr>
<tr><td>64</td><td>726.55</td><td>297.62</td><td>907.68</td><td>947.03</td><td>315.53</td></tr>
<tr><td>64</td><td>285.31</td><td>557.98</td><td>264.84</td><td>736.76</td><td>933.54</td></tr>
<tr><td>64</td><td>753.71</td><td>538.5</td><td>638.12</td><td>657.32</td><td>677.71</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>654.21</td>
<td>566.47</td>
<td>701.33</td>
<td>838.85</td>
<td>772.58</td>
</tr>
<tr>
<td>standard dev.</td>
<td>206.66</td>
<td>207.16</td>
<td>271.46</td>
<td>134.93</td>
<td>282.99</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>457.19</td>
<td>368.96</td>
<td>442.53</td>
<td>710.21</td>
<td>502.78</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>851.24</td>
<td>763.97</td>
<td>960.14</td>
<td>967.5</td>
<td>1042.39</td>
</tr>
<tr>
<td>geom. mean</td>
<td>615.75</td>
<td>535.23</td>
<td>642.15</td>
<td>829.71</td>
<td>715.16</td>
</tr>
<tr>
<td>median</td>
<td>743.03</td>
<td>557.98</td>
<td>762.48</td>
<td>892.24</td>
<td>933.54</td>
</tr>
<tr>
<td>first quartile</td>
<td>726.55</td>
<td>538.5</td>
<td>638.12</td>
<td>736.76</td>
<td>677.71</td>
</tr>
<tr>
<td>third quartile</td>
<td>753.71</td>
<td>557.98</td>
<td>907.68</td>
<td>947.03</td>
<td>960.92</td>
</tr>
<tr>
<td>minimum</td>
<td>285.31</td>
<td>297.62</td>
<td>264.84</td>
<td>657.32</td>
<td>315.53</td>
</tr>
<tr>
<td>maximum</td>
<td>762.48</td>
<td>880.25</td>
<td>933.54</td>
<td>960.92</td>
<td>975.22</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>64</td><td>868.58</td><td>975.22</td><td>1041.06</td><td>1097.73</td><td>1097.73</td></tr>
<tr><td>64</td><td>846.16</td><td>978.86</td><td>1045.21</td><td>1057.86</td><td>1116.43</td></tr>
<tr><td>64</td><td>248.05</td><td>930.23</td><td>989.95</td><td>1075.22</td><td>323.71</td></tr>
<tr><td>64</td><td>812.08</td><td>960.92</td><td>1041.06</td><td>297.62</td><td>1135.78</td></tr>
<tr><td>64</td><td>857.22</td><td>596.04</td><td>1041.06</td><td>1079.64</td><td>1135.78</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>726.42</td>
<td>888.25</td>
<td>1031.67</td>
<td>921.61</td>
<td>961.88</td>
</tr>
<tr>
<td>standard dev.</td>
<td>268.25</td>
<td>164.47</td>
<td>23.39</td>
<td>349.11</td>
<td>357.1</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>470.67</td>
<td>731.45</td>
<td>1009.37</td>
<td>588.77</td>
<td>621.43</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>982.17</td>
<td>1045.06</td>
<td>1053.96</td>
<td>1254.45</td>
<td>1302.34</td>
</tr>
<tr>
<td>geom. mean</td>
<td>661.76</td>
<td>873.52</td>
<td>1031.45</td>
<td>833.05</td>
<td>874.61</td>
</tr>
<tr>
<td>median</td>
<td>846.16</td>
<td>960.92</td>
<td>1041.06</td>
<td>1075.22</td>
<td>1116.43</td>
</tr>
<tr>
<td>first quartile</td>
<td>812.08</td>
<td>930.23</td>
<td>1041.06</td>
<td>1057.86</td>
<td>1097.73</td>
</tr>
<tr>
<td>third quartile</td>
<td>857.22</td>
<td>975.22</td>
<td>1041.06</td>
<td>1079.64</td>
<td>1135.78</td>
</tr>
<tr>
<td>minimum</td>
<td>248.05</td>
<td>596.04</td>
<td>989.95</td>
<td>297.62</td>
<td>323.71</td>
</tr>
<tr>
<td>maximum</td>
<td>868.58</td>
<td>978.86</td>
<td>1045.21</td>
<td>1097.73</td>
<td>1135.78</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>11.04 % </td>
<td>56.81 % </td>
<td>47.1 % </td>
<td>9.87 % </td>
<td>24.5 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.6463</td>
<td>0.0262</td>
<td>0.0266</td>
<td>0.6343</td>
<td>0.3801</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="128"></a> 
<img src="128.png" alt="128" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="6">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>128</td><td>448.18</td><td>967.67</td><td>1024.39</td><td>1088.17</td><td>1057.45</td><td>1106.55</td></tr>
<tr><td>128</td><td>516.64</td><td>595.24</td><td>999.01</td><td>1032.46</td><td>690.03</td><td>612.63</td></tr>
<tr><td>128</td><td>855.55</td><td>482.41</td><td>984.01</td><td>1068.22</td><td>1040.65</td><td>1106.55</td></tr>
<tr><td>128</td><td>690.94</td><td>931.56</td><td>893.46</td><td>385.56</td><td>714.48</td><td>1051.09</td></tr>
<tr><td>128</td><td>822.02</td><td>371.1</td><td>991.46</td><td>1016.44</td><td>512.6</td><td>1051.09</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>666.67</td>
<td>669.59</td>
<td>978.47</td>
<td>918.17</td>
<td>803.04</td>
<td>985.58</td>
</tr>
<tr>
<td>standard dev.</td>
<td>180.72</td>
<td>267.93</td>
<td>49.89</td>
<td>299.09</td>
<td>237.78</td>
<td>210.32</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>494.37</td>
<td>414.15</td>
<td>930.9</td>
<td>633.03</td>
<td>576.34</td>
<td>785.06</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>838.97</td>
<td>925.03</td>
<td>1026.03</td>
<td>1203.32</td>
<td>1029.74</td>
<td>1186.1</td>
</tr>
<tr>
<td>geom. mean</td>
<td>646.01</td>
<td>625.9</td>
<td>977.41</td>
<td>859.97</td>
<td>774.18</td>
<td>963.12</td>
</tr>
<tr>
<td>median</td>
<td>690.94</td>
<td>595.24</td>
<td>991.46</td>
<td>1032.46</td>
<td>714.48</td>
<td>1051.09</td>
</tr>
<tr>
<td>first quartile</td>
<td>516.64</td>
<td>482.41</td>
<td>984.01</td>
<td>1016.44</td>
<td>690.03</td>
<td>1051.09</td>
</tr>
<tr>
<td>third quartile</td>
<td>822.02</td>
<td>931.56</td>
<td>999.01</td>
<td>1068.22</td>
<td>1040.65</td>
<td>1106.55</td>
</tr>
<tr>
<td>minimum</td>
<td>448.18</td>
<td>371.1</td>
<td>893.46</td>
<td>385.56</td>
<td>512.6</td>
<td>612.63</td>
</tr>
<tr>
<td>maximum</td>
<td>855.55</td>
<td>967.67</td>
<td>1024.39</td>
<td>1088.17</td>
<td>1057.45</td>
<td>1106.55</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>128</td><td>926.62</td><td>1097.28</td><td>1178.69</td><td>1200.28</td><td>1251.86</td><td>1248.88</td></tr>
<tr><td>128</td><td>578.17</td><td>1088.17</td><td>1168.18</td><td>1189.38</td><td>1211.37</td><td>1225.53</td></tr>
<tr><td>128</td><td>920.12</td><td>1079.21</td><td>1125.55</td><td>1189.38</td><td>1214.17</td><td>1260.9</td></tr>
<tr><td>128</td><td>839.12</td><td>399.36</td><td>1051.09</td><td>512.1</td><td>1200.28</td><td>1225.53</td></tr>
<tr><td>128</td><td>905.81</td><td>1088.17</td><td>1157.87</td><td>546.24</td><td>1237.09</td><td>463.23</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>833.97</td>
<td>950.44</td>
<td>1136.28</td>
<td>927.48</td>
<td>1222.96</td>
<td>1084.81</td>
</tr>
<tr>
<td>standard dev.</td>
<td>147.16</td>
<td>308.13</td>
<td>51.61</td>
<td>363.83</td>
<td>20.98</td>
<td>347.81</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>693.66</td>
<td>656.68</td>
<td>1087.07</td>
<td>580.6</td>
<td>1202.95</td>
<td>753.21</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>974.27</td>
<td>1244.21</td>
<td>1185.48</td>
<td>1274.35</td>
<td>1242.96</td>
<td>1416.41</td>
</tr>
<tr>
<td>geom. mean</td>
<td>821.74</td>
<td>890.51</td>
<td>1135.31</td>
<td>861.65</td>
<td>1222.81</td>
<td>1018.43</td>
</tr>
<tr>
<td>median</td>
<td>905.81</td>
<td>1088.17</td>
<td>1157.87</td>
<td>1189.38</td>
<td>1214.17</td>
<td>1225.53</td>
</tr>
<tr>
<td>first quartile</td>
<td>839.12</td>
<td>1079.21</td>
<td>1125.55</td>
<td>546.24</td>
<td>1211.37</td>
<td>1225.53</td>
</tr>
<tr>
<td>third quartile</td>
<td>920.12</td>
<td>1088.17</td>
<td>1168.18</td>
<td>1189.38</td>
<td>1237.09</td>
<td>1248.88</td>
</tr>
<tr>
<td>minimum</td>
<td>578.17</td>
<td>399.36</td>
<td>1051.09</td>
<td>512.1</td>
<td>1200.28</td>
<td>463.23</td>
</tr>
<tr>
<td>maximum</td>
<td>926.62</td>
<td>1097.28</td>
<td>1178.69</td>
<td>1200.28</td>
<td>1251.86</td>
<td>1260.9</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>25.1 % </td>
<td>41.94 % </td>
<td>16.13 % </td>
<td>1.01 % </td>
<td>52.29 % </td>
<td>10.07 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.1471</td>
<td>0.1626</td>
<td>0.0012</td>
<td>0.9658</td>
<td>0.0043</td>
<td>0.6</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
</tr>
</table>
<a name="256"></a> 
<img src="256.png" alt="256" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="7">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>256</td><td>912.75</td><td>1028.21</td><td>1101.67</td><td>1174.47</td><td>718.3</td><td>1195.9</td><td>1190.47</td></tr>
<tr><td>256</td><td>883.53</td><td>600.97</td><td>1101.67</td><td>1131.39</td><td>1007.46</td><td>713.9</td><td>1156.34</td></tr>
<tr><td>256</td><td>889.52</td><td>1016.25</td><td>1082.34</td><td>1141.24</td><td>1111.01</td><td>708.11</td><td>1120.51</td></tr>
<tr><td>256</td><td>722.26</td><td>442.47</td><td>710.51</td><td>656.26</td><td>1147.48</td><td>696.35</td><td>992.21</td></tr>
<tr><td>256</td><td>833.65</td><td>1003.61</td><td>1059.38</td><td>453.77</td><td>1136.29</td><td>661.23</td><td>995.98</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>848.34</td>
<td>818.3</td>
<td>1011.11</td>
<td>911.43</td>
<td>1024.11</td>
<td>795.1</td>
<td>1091.1</td>
</tr>
<tr>
<td>standard dev.</td>
<td>76.15</td>
<td>276.62</td>
<td>168.94</td>
<td>333.52</td>
<td>179.69</td>
<td>224.99</td>
<td>91.95</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>775.74</td>
<td>554.58</td>
<td>850.05</td>
<td>593.45</td>
<td>852.79</td>
<td>580.6</td>
<td>1003.43</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>920.94</td>
<td>1082.03</td>
<td>1172.18</td>
<td>1229.4</td>
<td>1195.42</td>
<td>1009.6</td>
<td>1178.77</td>
</tr>
<tr>
<td>geom. mean</td>
<td>845.44</td>
<td>774.6</td>
<td>997.74</td>
<td>853.0</td>
<td>1009.48</td>
<td>774.32</td>
<td>1087.97</td>
</tr>
<tr>
<td>median</td>
<td>883.53</td>
<td>1003.61</td>
<td>1082.34</td>
<td>1131.39</td>
<td>1111.01</td>
<td>708.11</td>
<td>1120.51</td>
</tr>
<tr>
<td>first quartile</td>
<td>833.65</td>
<td>600.97</td>
<td>1059.38</td>
<td>656.26</td>
<td>1007.46</td>
<td>696.35</td>
<td>995.98</td>
</tr>
<tr>
<td>third quartile</td>
<td>889.52</td>
<td>1016.25</td>
<td>1101.67</td>
<td>1141.24</td>
<td>1136.29</td>
<td>713.9</td>
<td>1156.34</td>
</tr>
<tr>
<td>minimum</td>
<td>722.26</td>
<td>442.47</td>
<td>710.51</td>
<td>453.77</td>
<td>718.3</td>
<td>661.23</td>
<td>992.21</td>
</tr>
<tr>
<td>maximum</td>
<td>912.75</td>
<td>1028.21</td>
<td>1101.67</td>
<td>1174.47</td>
<td>1147.48</td>
<td>1195.9</td>
<td>1190.47</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>256</td><td>972.88</td><td>1185.09</td><td>1268.22</td><td>1329.32</td><td>1162.75</td><td>1322.61</td><td>1336.1</td></tr>
<tr><td>256</td><td>954.29</td><td>642.59</td><td>1219.55</td><td>1250.08</td><td>1351.6</td><td>1336.1</td><td>743.77</td></tr>
<tr><td>256</td><td>969.28</td><td>1146.23</td><td>742.19</td><td>1269.76</td><td>1282.18</td><td>584.23</td><td>716.33</td></tr>
<tr><td>256</td><td>976.5</td><td>1162.75</td><td>1244.15</td><td>716.33</td><td>752.85</td><td>1331.01</td><td>1301.28</td></tr>
<tr><td>256</td><td>642.59</td><td>1179.76</td><td>1231.0</td><td>1282.18</td><td>1349.86</td><td>1322.61</td><td>1120.51</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>903.11</td>
<td>1063.28</td>
<td>1141.02</td>
<td>1169.54</td>
<td>1179.85</td>
<td>1179.31</td>
<td>1043.6</td>
</tr>
<tr>
<td>standard dev.</td>
<td>145.88</td>
<td>235.67</td>
<td>223.69</td>
<td>255.02</td>
<td>250.74</td>
<td>332.71</td>
<td>297.85</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>764.03</td>
<td>838.6</td>
<td>927.76</td>
<td>926.4</td>
<td>940.79</td>
<td>862.11</td>
<td>759.63</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1042.19</td>
<td>1287.97</td>
<td>1354.28</td>
<td>1412.67</td>
<td>1418.9</td>
<td>1496.52</td>
<td>1327.57</td>
</tr>
<tr>
<td>geom. mean</td>
<td>891.99</td>
<td>1036.68</td>
<td>1119.46</td>
<td>1141.49</td>
<td>1154.13</td>
<td>1126.92</td>
<td>1007.48</td>
</tr>
<tr>
<td>median</td>
<td>969.28</td>
<td>1162.75</td>
<td>1231.0</td>
<td>1269.76</td>
<td>1282.18</td>
<td>1322.61</td>
<td>1120.51</td>
</tr>
<tr>
<td>first quartile</td>
<td>954.29</td>
<td>1146.23</td>
<td>1219.55</td>
<td>1250.08</td>
<td>1162.75</td>
<td>1322.61</td>
<td>743.77</td>
</tr>
<tr>
<td>third quartile</td>
<td>972.88</td>
<td>1179.76</td>
<td>1244.15</td>
<td>1282.18</td>
<td>1349.86</td>
<td>1331.01</td>
<td>1301.28</td>
</tr>
<tr>
<td>minimum</td>
<td>642.59</td>
<td>642.59</td>
<td>742.19</td>
<td>716.33</td>
<td>752.85</td>
<td>584.23</td>
<td>716.33</td>
</tr>
<tr>
<td>maximum</td>
<td>976.5</td>
<td>1185.09</td>
<td>1268.22</td>
<td>1329.32</td>
<td>1351.6</td>
<td>1336.1</td>
<td>1336.1</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>6.46 % </td>
<td>29.94 % </td>
<td>12.85 % </td>
<td>28.32 % </td>
<td>15.21 % </td>
<td>48.32 % </td>
<td>-4.35 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.4781</td>
<td>0.1701</td>
<td>0.3304</td>
<td>0.2065</td>
<td>0.2917</td>
<td>0.0649</td>
<td>0.7421</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
</tr>
</table>
<a name="512"></a> 
<img src="512.png" alt="512" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="8">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>512</td><td>755.24</td><td>841.62</td><td>837.58</td><td>1187.65</td><td>919.08</td><td>910.69</td><td>1210.96</td><td>910.69</td></tr>
<tr><td>512</td><td>595.98</td><td>952.47</td><td>788.76</td><td>995.89</td><td>1087.28</td><td>1055.01</td><td>1162.63</td><td>755.24</td></tr>
<tr><td>512</td><td>915.86</td><td>801.42</td><td>1075.02</td><td>877.17</td><td>1167.8</td><td>910.69</td><td>889.83</td><td>877.17</td></tr>
<tr><td>512</td><td>713.12</td><td>720.47</td><td>1110.89</td><td>722.46</td><td>865.23</td><td>750.91</td><td>1163.27</td><td>886.44</td></tr>
<tr><td>512</td><td>770.5</td><td>715.31</td><td>949.02</td><td>1146.73</td><td>874.25</td><td>883.46</td><td>1165.21</td><td>1133.71</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>750.14</td>
<td>806.26</td>
<td>952.25</td>
<td>985.98</td>
<td>982.73</td>
<td>902.15</td>
<td>1118.38</td>
<td>912.65</td>
</tr>
<tr>
<td>standard dev.</td>
<td>115.15</td>
<td>97.83</td>
<td>141.53</td>
<td>192.28</td>
<td>136.76</td>
<td>108.09</td>
<td>129.4</td>
<td>137.47</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>640.36</td>
<td>712.99</td>
<td>817.32</td>
<td>802.66</td>
<td>852.34</td>
<td>799.1</td>
<td>995.01</td>
<td>781.59</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>859.93</td>
<td>899.53</td>
<td>1087.19</td>
<td>1169.3</td>
<td>1113.11</td>
<td>1005.2</td>
<td>1241.74</td>
<td>1043.72</td>
</tr>
<tr>
<td>geom. mean</td>
<td>743.05</td>
<td>801.65</td>
<td>943.77</td>
<td>970.18</td>
<td>975.36</td>
<td>896.92</td>
<td>1111.71</td>
<td>904.77</td>
</tr>
<tr>
<td>median</td>
<td>755.24</td>
<td>801.42</td>
<td>949.02</td>
<td>995.89</td>
<td>919.08</td>
<td>910.69</td>
<td>1163.27</td>
<td>886.44</td>
</tr>
<tr>
<td>first quartile</td>
<td>713.12</td>
<td>720.47</td>
<td>837.58</td>
<td>877.17</td>
<td>874.25</td>
<td>883.46</td>
<td>1162.63</td>
<td>877.17</td>
</tr>
<tr>
<td>third quartile</td>
<td>770.5</td>
<td>841.62</td>
<td>1075.02</td>
<td>1146.73</td>
<td>1087.28</td>
<td>910.69</td>
<td>1165.21</td>
<td>910.69</td>
</tr>
<tr>
<td>minimum</td>
<td>595.98</td>
<td>715.31</td>
<td>788.76</td>
<td>722.46</td>
<td>865.23</td>
<td>750.91</td>
<td>889.83</td>
<td>755.24</td>
</tr>
<tr>
<td>maximum</td>
<td>915.86</td>
<td>952.47</td>
<td>1110.89</td>
<td>1187.65</td>
<td>1167.8</td>
<td>1055.01</td>
<td>1210.96</td>
<td>1133.71</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>512</td><td>992.12</td><td>811.65</td><td>897.44</td><td>938.4</td><td>1366.4</td><td>1354.92</td><td>1282.03</td><td>1340.2</td></tr>
<tr><td>512</td><td>725.71</td><td>826.36</td><td>891.34</td><td>1322.45</td><td>932.98</td><td>922.71</td><td>931.32</td><td>927.61</td></tr>
<tr><td>512</td><td>741.88</td><td>1118.6</td><td>872.43</td><td>1301.93</td><td>715.31</td><td>1330.0</td><td>930.91</td><td>974.6</td></tr>
<tr><td>512</td><td>913.87</td><td>894.38</td><td>891.34</td><td>676.54</td><td>1333.38</td><td>948.59</td><td>945.17</td><td>937.98</td></tr>
<tr><td>512</td><td>719.24</td><td>1088.97</td><td>678.51</td><td>1208.17</td><td>948.59</td><td>923.93</td><td>954.2</td><td>1330.0</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>818.56</td>
<td>947.99</td>
<td>846.21</td>
<td>1089.5</td>
<td>1059.33</td>
<td>1096.03</td>
<td>1008.73</td>
<td>1102.08</td>
</tr>
<tr>
<td>standard dev.</td>
<td>126.07</td>
<td>145.98</td>
<td>94.22</td>
<td>276.96</td>
<td>281.06</td>
<td>225.37</td>
<td>153.1</td>
<td>213.46</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>698.37</td>
<td>808.82</td>
<td>756.39</td>
<td>825.44</td>
<td>791.37</td>
<td>881.17</td>
<td>862.76</td>
<td>898.57</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>938.76</td>
<td>1087.17</td>
<td>936.04</td>
<td>1353.56</td>
<td>1327.29</td>
<td>1310.89</td>
<td>1154.69</td>
<td>1305.59</td>
</tr>
<tr>
<td>geom. mean</td>
<td>811.12</td>
<td>939.18</td>
<td>841.54</td>
<td>1057.2</td>
<td>1028.95</td>
<td>1078.23</td>
<td>1000.49</td>
<td>1086.13</td>
</tr>
<tr>
<td>median</td>
<td>741.88</td>
<td>894.38</td>
<td>891.34</td>
<td>1208.17</td>
<td>948.59</td>
<td>948.59</td>
<td>945.17</td>
<td>974.6</td>
</tr>
<tr>
<td>first quartile</td>
<td>725.71</td>
<td>826.36</td>
<td>872.43</td>
<td>938.4</td>
<td>932.98</td>
<td>923.93</td>
<td>931.32</td>
<td>937.98</td>
</tr>
<tr>
<td>third quartile</td>
<td>913.87</td>
<td>1088.97</td>
<td>891.34</td>
<td>1301.93</td>
<td>1333.38</td>
<td>1330.0</td>
<td>954.2</td>
<td>1330.0</td>
</tr>
<tr>
<td>minimum</td>
<td>719.24</td>
<td>811.65</td>
<td>678.51</td>
<td>676.54</td>
<td>715.31</td>
<td>922.71</td>
<td>930.91</td>
<td>927.61</td>
</tr>
<tr>
<td>maximum</td>
<td>992.12</td>
<td>1118.6</td>
<td>897.44</td>
<td>1322.45</td>
<td>1366.4</td>
<td>1354.92</td>
<td>1282.03</td>
<td>1340.2</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>9.12 % </td>
<td>17.58 % </td>
<td>-11.14 % </td>
<td>10.5 % </td>
<td>7.79 % </td>
<td>21.49 % </td>
<td>-9.8 % </td>
<td>20.76 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.3964</td>
<td>0.109</td>
<td>0.2006</td>
<td>0.5118</td>
<td>0.5986</td>
<td>0.1211</td>
<td>0.2561</td>
<td>0.1338</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="1024"></a> 
<img src="1024.png" alt="1024" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>1024</td><td>834.06</td><td>953.29</td><td>1007.08</td><td>1041.6</td><td>1064.06</td><td>1043.67</td><td>1054.96</td><td>1053.9</td><td>1219.7</td></tr>
<tr><td>1024</td><td>588.61</td><td>673.37</td><td>695.48</td><td>853.92</td><td>708.76</td><td>882.68</td><td>905.74</td><td>896.83</td><td>945.34</td></tr>
<tr><td>1024</td><td>787.99</td><td>892.82</td><td>943.43</td><td>984.16</td><td>1017.09</td><td>1012.19</td><td>997.03</td><td>1010.24</td><td>1001.07</td></tr>
<tr><td>1024</td><td>678.93</td><td>625.75</td><td>826.5</td><td>814.3</td><td>711.28</td><td>765.13</td><td>856.89</td><td>822.44</td><td>967.14</td></tr>
<tr><td>1024</td><td>706.73</td><td>849.6</td><td>859.17</td><td>868.06</td><td>918.43</td><td>861.29</td><td>858.29</td><td>884.16</td><td>907.5</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>719.26</td>
<td>798.97</td>
<td>866.33</td>
<td>912.41</td>
<td>883.93</td>
<td>912.99</td>
<td>934.58</td>
<td>933.51</td>
<td>1008.15</td>
</tr>
<tr>
<td>standard dev.</td>
<td>95.86</td>
<td>142.27</td>
<td>118.94</td>
<td>95.98</td>
<td>167.23</td>
<td>114.42</td>
<td>88.14</td>
<td>95.52</td>
<td>123.04</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>627.87</td>
<td>663.33</td>
<td>752.94</td>
<td>820.9</td>
<td>724.49</td>
<td>803.9</td>
<td>850.54</td>
<td>842.45</td>
<td>890.84</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>810.65</td>
<td>934.61</td>
<td>979.72</td>
<td>1003.92</td>
<td>1043.36</td>
<td>1022.08</td>
<td>1018.62</td>
<td>1024.58</td>
<td>1125.46</td>
</tr>
<tr>
<td>geom. mean</td>
<td>714.04</td>
<td>788.45</td>
<td>859.56</td>
<td>908.46</td>
<td>870.93</td>
<td>907.2</td>
<td>931.32</td>
<td>929.64</td>
<td>1002.6</td>
</tr>
<tr>
<td>median</td>
<td>706.73</td>
<td>849.6</td>
<td>859.17</td>
<td>868.06</td>
<td>918.43</td>
<td>882.68</td>
<td>905.74</td>
<td>896.83</td>
<td>967.14</td>
</tr>
<tr>
<td>first quartile</td>
<td>678.93</td>
<td>673.37</td>
<td>826.5</td>
<td>853.92</td>
<td>711.28</td>
<td>861.29</td>
<td>858.29</td>
<td>884.16</td>
<td>945.34</td>
</tr>
<tr>
<td>third quartile</td>
<td>787.99</td>
<td>892.82</td>
<td>943.43</td>
<td>984.16</td>
<td>1017.09</td>
<td>1012.19</td>
<td>997.03</td>
<td>1010.24</td>
<td>1001.07</td>
</tr>
<tr>
<td>minimum</td>
<td>588.61</td>
<td>625.75</td>
<td>695.48</td>
<td>814.3</td>
<td>708.76</td>
<td>765.13</td>
<td>856.89</td>
<td>822.44</td>
<td>907.5</td>
</tr>
<tr>
<td>maximum</td>
<td>834.06</td>
<td>953.29</td>
<td>1007.08</td>
<td>1041.6</td>
<td>1064.06</td>
<td>1043.67</td>
<td>1054.96</td>
<td>1053.9</td>
<td>1219.7</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>1024</td><td>807.09</td><td>966.25</td><td>1067.03</td><td>1108.49</td><td>1154.56</td><td>1168.39</td><td>1189.26</td><td>1162.89</td><td>1183.56</td></tr>
<tr><td>1024</td><td>843.79</td><td>977.51</td><td>980.25</td><td>1111.13</td><td>1108.49</td><td>1144.17</td><td>1138.89</td><td>1146.99</td><td>1106.15</td></tr>
<tr><td>1024</td><td>817.0</td><td>759.31</td><td>1054.69</td><td>1079.95</td><td>1351.34</td><td>1088.07</td><td>1122.43</td><td>1114.97</td><td>1153.29</td></tr>
<tr><td>1024</td><td>755.21</td><td>972.75</td><td>1037.22</td><td>1077.73</td><td>1104.98</td><td>1116.16</td><td>1121.23</td><td>1170.68</td><td>1149.19</td></tr>
<tr><td>1024</td><td>833.23</td><td>973.65</td><td>1040.56</td><td>1092.89</td><td>1102.37</td><td>1173.62</td><td>989.27</td><td>1101.21</td><td>1156.15</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>811.26</td>
<td>929.89</td>
<td>1035.95</td>
<td>1094.04</td>
<td>1164.35</td>
<td>1138.08</td>
<td>1112.22</td>
<td>1139.35</td>
<td>1149.67</td>
</tr>
<tr>
<td>standard dev.</td>
<td>34.4</td>
<td>95.44</td>
<td>33.33</td>
<td>15.55</td>
<td>106.71</td>
<td>36.06</td>
<td>74.08</td>
<td>30.18</td>
<td>27.83</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>778.47</td>
<td>838.9</td>
<td>1004.18</td>
<td>1079.21</td>
<td>1062.61</td>
<td>1103.71</td>
<td>1041.59</td>
<td>1110.58</td>
<td>1123.14</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>844.06</td>
<td>1020.89</td>
<td>1067.72</td>
<td>1108.86</td>
<td>1266.09</td>
<td>1172.46</td>
<td>1182.84</td>
<td>1168.12</td>
<td>1176.2</td>
</tr>
<tr>
<td>geom. mean</td>
<td>810.67</td>
<td>925.57</td>
<td>1035.51</td>
<td>1093.95</td>
<td>1160.7</td>
<td>1137.62</td>
<td>1110.16</td>
<td>1139.02</td>
<td>1149.4</td>
</tr>
<tr>
<td>median</td>
<td>817.0</td>
<td>972.75</td>
<td>1040.56</td>
<td>1092.89</td>
<td>1108.49</td>
<td>1144.17</td>
<td>1122.43</td>
<td>1146.99</td>
<td>1153.29</td>
</tr>
<tr>
<td>first quartile</td>
<td>807.09</td>
<td>966.25</td>
<td>1037.22</td>
<td>1079.95</td>
<td>1104.98</td>
<td>1116.16</td>
<td>1121.23</td>
<td>1114.97</td>
<td>1149.19</td>
</tr>
<tr>
<td>third quartile</td>
<td>833.23</td>
<td>973.65</td>
<td>1054.69</td>
<td>1108.49</td>
<td>1154.56</td>
<td>1168.39</td>
<td>1138.89</td>
<td>1162.89</td>
<td>1156.15</td>
</tr>
<tr>
<td>minimum</td>
<td>755.21</td>
<td>759.31</td>
<td>980.25</td>
<td>1077.73</td>
<td>1102.37</td>
<td>1088.07</td>
<td>989.27</td>
<td>1101.21</td>
<td>1106.15</td>
</tr>
<tr>
<td>maximum</td>
<td>843.79</td>
<td>977.51</td>
<td>1067.03</td>
<td>1111.13</td>
<td>1351.34</td>
<td>1173.62</td>
<td>1189.26</td>
<td>1170.68</td>
<td>1183.56</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>12.79 % </td>
<td>16.39 % </td>
<td>19.58 % </td>
<td>19.91 % </td>
<td>31.72 % </td>
<td>24.65 % </td>
<td>19.01 % </td>
<td>22.05 % </td>
<td>14.04 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0781</td>
<td>0.1259</td>
<td>0.0153</td>
<td>0.0031</td>
<td>0.0134</td>
<td>0.003</td>
<td>0.0087</td>
<td>0.0018</td>
<td>0.0365</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="2048"></a> 
<img src="2048.png" alt="2048" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="10">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>2048</td><td>794.62</td><td>946.92</td><td>1001.05</td><td>1041.57</td><td>1033.61</td><td>1119.11</td><td>1135.16</td><td>1140.25</td><td>1133.78</td><td>1037.32</td></tr>
<tr><td>2048</td><td>693.74</td><td>819.05</td><td>787.08</td><td>810.04</td><td>831.23</td><td>831.97</td><td>931.16</td><td>856.52</td><td>912.42</td><td>984.72</td></tr>
<tr><td>2048</td><td>791.77</td><td>833.38</td><td>938.97</td><td>984.72</td><td>1002.49</td><td>1009.0</td><td>1002.01</td><td>1017.81</td><td>1009.6</td><td>973.74</td></tr>
<tr><td>2048</td><td>747.39</td><td>824.37</td><td>821.7</td><td>982.29</td><td>843.52</td><td>877.58</td><td>937.61</td><td>866.97</td><td>965.34</td><td>837.87</td></tr>
<tr><td>2048</td><td>711.21</td><td>814.68</td><td>790.5</td><td>918.21</td><td>1000.93</td><td>872.56</td><td>908.27</td><td>1029.43</td><td>861.27</td><td>988.2</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>747.75</td>
<td>847.68</td>
<td>867.86</td>
<td>947.37</td>
<td>942.35</td>
<td>942.04</td>
<td>982.84</td>
<td>982.2</td>
<td>976.48</td>
<td>964.37</td>
</tr>
<tr>
<td>standard dev.</td>
<td>45.79</td>
<td>55.91</td>
<td>96.74</td>
<td>88.31</td>
<td>96.82</td>
<td>119.3</td>
<td>91.99</td>
<td>119.95</td>
<td>104.09</td>
<td>74.82</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>704.09</td>
<td>794.37</td>
<td>775.63</td>
<td>863.17</td>
<td>850.05</td>
<td>828.3</td>
<td>895.14</td>
<td>867.84</td>
<td>877.24</td>
<td>893.03</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>791.4</td>
<td>900.99</td>
<td>960.1</td>
<td>1031.57</td>
<td>1034.66</td>
<td>1055.79</td>
<td>1070.54</td>
<td>1096.56</td>
<td>1075.72</td>
<td>1035.7</td>
</tr>
<tr>
<td>geom. mean</td>
<td>746.62</td>
<td>846.28</td>
<td>863.67</td>
<td>943.93</td>
<td>938.28</td>
<td>936.25</td>
<td>979.57</td>
<td>976.34</td>
<td>972.16</td>
<td>961.92</td>
</tr>
<tr>
<td>median</td>
<td>747.39</td>
<td>824.37</td>
<td>821.7</td>
<td>982.29</td>
<td>1000.93</td>
<td>877.58</td>
<td>937.61</td>
<td>1017.81</td>
<td>965.34</td>
<td>984.72</td>
</tr>
<tr>
<td>first quartile</td>
<td>711.21</td>
<td>819.05</td>
<td>790.5</td>
<td>918.21</td>
<td>843.52</td>
<td>872.56</td>
<td>931.16</td>
<td>866.97</td>
<td>912.42</td>
<td>973.74</td>
</tr>
<tr>
<td>third quartile</td>
<td>791.77</td>
<td>833.38</td>
<td>938.97</td>
<td>984.72</td>
<td>1002.49</td>
<td>1009.0</td>
<td>1002.01</td>
<td>1029.43</td>
<td>1009.6</td>
<td>988.2</td>
</tr>
<tr>
<td>minimum</td>
<td>693.74</td>
<td>814.68</td>
<td>787.08</td>
<td>810.04</td>
<td>831.23</td>
<td>831.97</td>
<td>908.27</td>
<td>856.52</td>
<td>861.27</td>
<td>837.87</td>
</tr>
<tr>
<td>maximum</td>
<td>794.62</td>
<td>946.92</td>
<td>1001.05</td>
<td>1041.57</td>
<td>1033.61</td>
<td>1119.11</td>
<td>1135.16</td>
<td>1140.25</td>
<td>1133.78</td>
<td>1037.32</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>2048</td><td>875.2</td><td>1018.92</td><td>1084.67</td><td>1148.21</td><td>1072.33</td><td>1182.03</td><td>1306.27</td><td>1216.48</td><td>1207.72</td><td>1284.47</td></tr>
<tr><td>2048</td><td>853.21</td><td>1002.96</td><td>964.78</td><td>1087.48</td><td>1137.0</td><td>1150.73</td><td>1147.43</td><td>1257.89</td><td>1289.6</td><td>1161.41</td></tr>
<tr><td>2048</td><td>831.23</td><td>995.94</td><td>1057.06</td><td>1115.39</td><td>1116.13</td><td>1154.06</td><td>1140.25</td><td>1168.2</td><td>1073.56</td><td>1153.42</td></tr>
<tr><td>2048</td><td>863.58</td><td>842.84</td><td>1062.68</td><td>1213.66</td><td>1224.83</td><td>1235.29</td><td>1150.1</td><td>1034.12</td><td>1171.63</td><td>1160.12</td></tr>
<tr><td>2048</td><td>850.27</td><td>986.68</td><td>1053.74</td><td>1096.43</td><td>1146.8</td><td>1137.62</td><td>1146.8</td><td>1144.92</td><td>1196.18</td><td>1169.66</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>854.7</td>
<td>969.47</td>
<td>1044.59</td>
<td>1132.23</td>
<td>1139.42</td>
<td>1171.94</td>
<td>1178.17</td>
<td>1164.32</td>
<td>1187.74</td>
<td>1185.82</td>
</tr>
<tr>
<td>standard dev.</td>
<td>16.37</td>
<td>71.76</td>
<td>46.21</td>
<td>51.12</td>
<td>55.67</td>
<td>38.93</td>
<td>71.7</td>
<td>84.88</td>
<td>77.69</td>
<td>55.45</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>839.09</td>
<td>901.05</td>
<td>1000.53</td>
<td>1083.49</td>
<td>1086.34</td>
<td>1134.83</td>
<td>1109.81</td>
<td>1083.4</td>
<td>1113.67</td>
<td>1132.95</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>870.3</td>
<td>1037.89</td>
<td>1088.64</td>
<td>1180.98</td>
<td>1192.5</td>
<td>1209.06</td>
<td>1246.53</td>
<td>1245.24</td>
<td>1261.81</td>
<td>1238.68</td>
</tr>
<tr>
<td>geom. mean</td>
<td>854.57</td>
<td>967.2</td>
<td>1043.74</td>
<td>1131.33</td>
<td>1138.34</td>
<td>1171.44</td>
<td>1176.51</td>
<td>1161.78</td>
<td>1185.68</td>
<td>1184.82</td>
</tr>
<tr>
<td>median</td>
<td>853.21</td>
<td>995.94</td>
<td>1057.06</td>
<td>1115.39</td>
<td>1137.0</td>
<td>1154.06</td>
<td>1147.43</td>
<td>1168.2</td>
<td>1196.18</td>
<td>1161.41</td>
</tr>
<tr>
<td>first quartile</td>
<td>850.27</td>
<td>986.68</td>
<td>1053.74</td>
<td>1096.43</td>
<td>1116.13</td>
<td>1150.73</td>
<td>1146.8</td>
<td>1144.92</td>
<td>1171.63</td>
<td>1160.12</td>
</tr>
<tr>
<td>third quartile</td>
<td>863.58</td>
<td>1002.96</td>
<td>1062.68</td>
<td>1148.21</td>
<td>1146.8</td>
<td>1182.03</td>
<td>1150.1</td>
<td>1216.48</td>
<td>1207.72</td>
<td>1169.66</td>
</tr>
<tr>
<td>minimum</td>
<td>831.23</td>
<td>842.84</td>
<td>964.78</td>
<td>1087.48</td>
<td>1072.33</td>
<td>1137.62</td>
<td>1140.25</td>
<td>1034.12</td>
<td>1073.56</td>
<td>1153.42</td>
</tr>
<tr>
<td>maximum</td>
<td>875.2</td>
<td>1018.92</td>
<td>1084.67</td>
<td>1213.66</td>
<td>1224.83</td>
<td>1235.29</td>
<td>1306.27</td>
<td>1257.89</td>
<td>1289.6</td>
<td>1284.47</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>14.3 % </td>
<td>14.37 % </td>
<td>20.36 % </td>
<td>19.51 % </td>
<td>20.91 % </td>
<td>24.4 % </td>
<td>19.87 % </td>
<td>18.54 % </td>
<td>21.63 % </td>
<td>22.96 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0012</td>
<td>0.0172</td>
<td>0.0062</td>
<td>0.0037</td>
<td>0.0043</td>
<td>0.0035</td>
<td>0.0057</td>
<td>0.0242</td>
<td>0.0066</td>
<td>0.0007</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="4096"></a> 
<img src="4096.png" alt="4096" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="11">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>4096</td><td>773.54</td><td>895.27</td><td>970.69</td><td>1027.96</td><td>1068.97</td><td>1076.44</td><td>1031.19</td><td>1030.93</td><td>1042.53</td><td>1018.05</td><td>992.8</td></tr>
<tr><td>4096</td><td>726.48</td><td>816.85</td><td>900.9</td><td>884.93</td><td>941.86</td><td>958.33</td><td>980.62</td><td>1008.56</td><td>975.37</td><td>995.51</td><td>964.33</td></tr>
<tr><td>4096</td><td>773.08</td><td>907.67</td><td>947.82</td><td>974.92</td><td>981.08</td><td>1008.56</td><td>1006.81</td><td>1005.54</td><td>992.57</td><td>977.99</td><td>970.41</td></tr>
<tr><td>4096</td><td>744.34</td><td>854.9</td><td>868.44</td><td>927.18</td><td>995.75</td><td>897.86</td><td>969.01</td><td>973.9</td><td>875.1</td><td>988.88</td><td>965.22</td></tr>
<tr><td>4096</td><td>724.88</td><td>838.58</td><td>898.05</td><td>905.17</td><td>967.39</td><td>999.01</td><td>941.65</td><td>939.86</td><td>977.48</td><td>1003.01</td><td>925.9</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>748.46</td>
<td>862.65</td>
<td>917.18</td>
<td>944.03</td>
<td>991.01</td>
<td>988.04</td>
<td>985.85</td>
<td>991.76</td>
<td>972.61</td>
<td>996.69</td>
<td>963.73</td>
</tr>
<tr>
<td>standard dev.</td>
<td>23.93</td>
<td>38.17</td>
<td>41.26</td>
<td>57.63</td>
<td>47.88</td>
<td>65.9</td>
<td>34.49</td>
<td>35.42</td>
<td>60.88</td>
<td>15.07</td>
<td>24.1</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>725.65</td>
<td>826.26</td>
<td>877.84</td>
<td>889.09</td>
<td>945.36</td>
<td>925.21</td>
<td>952.97</td>
<td>957.99</td>
<td>914.56</td>
<td>982.32</td>
<td>940.76</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>771.28</td>
<td>899.05</td>
<td>956.51</td>
<td>998.98</td>
<td>1036.66</td>
<td>1050.87</td>
<td>1018.74</td>
<td>1025.53</td>
<td>1030.65</td>
<td>1011.06</td>
<td>986.71</td>
</tr>
<tr>
<td>geom. mean</td>
<td>748.16</td>
<td>861.98</td>
<td>916.44</td>
<td>942.65</td>
<td>990.1</td>
<td>986.27</td>
<td>985.37</td>
<td>991.25</td>
<td>971.04</td>
<td>996.6</td>
<td>963.49</td>
</tr>
<tr>
<td>median</td>
<td>744.34</td>
<td>854.9</td>
<td>900.9</td>
<td>927.18</td>
<td>981.08</td>
<td>999.01</td>
<td>980.62</td>
<td>1005.54</td>
<td>977.48</td>
<td>995.51</td>
<td>965.22</td>
</tr>
<tr>
<td>first quartile</td>
<td>726.48</td>
<td>838.58</td>
<td>898.05</td>
<td>905.17</td>
<td>967.39</td>
<td>958.33</td>
<td>969.01</td>
<td>973.9</td>
<td>975.37</td>
<td>988.88</td>
<td>964.33</td>
</tr>
<tr>
<td>third quartile</td>
<td>773.08</td>
<td>895.27</td>
<td>947.82</td>
<td>974.92</td>
<td>995.75</td>
<td>1008.56</td>
<td>1006.81</td>
<td>1008.56</td>
<td>992.57</td>
<td>1003.01</td>
<td>970.41</td>
</tr>
<tr>
<td>minimum</td>
<td>724.88</td>
<td>816.85</td>
<td>868.44</td>
<td>884.93</td>
<td>941.86</td>
<td>897.86</td>
<td>941.65</td>
<td>939.86</td>
<td>875.1</td>
<td>977.99</td>
<td>925.9</td>
</tr>
<tr>
<td>maximum</td>
<td>773.54</td>
<td>907.67</td>
<td>970.69</td>
<td>1027.96</td>
<td>1068.97</td>
<td>1076.44</td>
<td>1031.19</td>
<td>1030.93</td>
<td>1042.53</td>
<td>1018.05</td>
<td>992.8</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>4096</td><td>827.98</td><td>1036.86</td><td>1100.09</td><td>1158.42</td><td>1242.59</td><td>1231.55</td><td>1229.66</td><td>1266.99</td><td>1196.59</td><td>1207.71</td><td>1122.99</td></tr>
<tr><td>4096</td><td>846.74</td><td>1050.43</td><td>1030.93</td><td>1141.55</td><td>1164.78</td><td>1204.07</td><td>1167.53</td><td>1206.23</td><td>1243.42</td><td>1180.01</td><td>1128.05</td></tr>
<tr><td>4096</td><td>830.89</td><td>1017.31</td><td>1127.74</td><td>1162.76</td><td>1133.46</td><td>1170.63</td><td>1218.41</td><td>2093.28</td><td>2052.31</td><td>1196.17</td><td>1106.18</td></tr>
<tr><td>4096</td><td>822.54</td><td>930.47</td><td>1073.55</td><td>1136.37</td><td>1205.54</td><td>1148.75</td><td>1178.27</td><td>1167.86</td><td>1237.28</td><td>1156.75</td><td>1154.44</td></tr>
<tr><td>4096</td><td>834.57</td><td>1008.8</td><td>1083.74</td><td>1119.84</td><td>1201.91</td><td>1208.49</td><td>1218.76</td><td>1172.35</td><td>1161.07</td><td>1216.9</td><td>1114.78</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>832.55</td>
<td>1008.77</td>
<td>1083.21</td>
<td>1143.79</td>
<td>1189.65</td>
<td>1192.7</td>
<td>1202.53</td>
<td>1381.34</td>
<td>1378.13</td>
<td>1191.51</td>
<td>1125.29</td>
</tr>
<tr>
<td>standard dev.</td>
<td>9.07</td>
<td>46.71</td>
<td>35.69</td>
<td>17.37</td>
<td>41.78</td>
<td>32.81</td>
<td>27.68</td>
<td>399.95</td>
<td>378.34</td>
<td>23.82</td>
<td>18.29</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>823.89</td>
<td>964.24</td>
<td>1049.19</td>
<td>1127.22</td>
<td>1149.82</td>
<td>1161.41</td>
<td>1176.14</td>
<td>1000.03</td>
<td>1017.42</td>
<td>1168.8</td>
<td>1107.85</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>841.2</td>
<td>1053.31</td>
<td>1117.24</td>
<td>1160.35</td>
<td>1229.48</td>
<td>1223.98</td>
<td>1228.91</td>
<td>1762.65</td>
<td>1738.84</td>
<td>1214.22</td>
<td>1142.72</td>
</tr>
<tr>
<td>geom. mean</td>
<td>832.51</td>
<td>1007.88</td>
<td>1082.74</td>
<td>1143.68</td>
<td>1189.06</td>
<td>1192.33</td>
<td>1202.27</td>
<td>1343.68</td>
<td>1344.08</td>
<td>1191.32</td>
<td>1125.17</td>
</tr>
<tr>
<td>median</td>
<td>830.89</td>
<td>1017.31</td>
<td>1083.74</td>
<td>1141.55</td>
<td>1201.91</td>
<td>1204.07</td>
<td>1218.41</td>
<td>1206.23</td>
<td>1237.28</td>
<td>1196.17</td>
<td>1122.99</td>
</tr>
<tr>
<td>first quartile</td>
<td>827.98</td>
<td>1008.8</td>
<td>1073.55</td>
<td>1136.37</td>
<td>1164.78</td>
<td>1170.63</td>
<td>1178.27</td>
<td>1172.35</td>
<td>1196.59</td>
<td>1180.01</td>
<td>1114.78</td>
</tr>
<tr>
<td>third quartile</td>
<td>834.57</td>
<td>1036.86</td>
<td>1100.09</td>
<td>1158.42</td>
<td>1205.54</td>
<td>1208.49</td>
<td>1218.76</td>
<td>1266.99</td>
<td>1243.42</td>
<td>1207.71</td>
<td>1128.05</td>
</tr>
<tr>
<td>minimum</td>
<td>822.54</td>
<td>930.47</td>
<td>1030.93</td>
<td>1119.84</td>
<td>1133.46</td>
<td>1148.75</td>
<td>1167.53</td>
<td>1167.86</td>
<td>1161.07</td>
<td>1156.75</td>
<td>1106.18</td>
</tr>
<tr>
<td>maximum</td>
<td>846.74</td>
<td>1050.43</td>
<td>1127.74</td>
<td>1162.76</td>
<td>1242.59</td>
<td>1231.55</td>
<td>1229.66</td>
<td>2093.28</td>
<td>2052.31</td>
<td>1216.9</td>
<td>1154.44</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>11.23 % </td>
<td>16.94 % </td>
<td>18.1 % </td>
<td>21.16 % </td>
<td>20.04 % </td>
<td>20.71 % </td>
<td>21.98 % </td>
<td>39.28 % </td>
<td>41.69 % </td>
<td>19.55 % </td>
<td>16.76 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0001</td>
<td>0.0006</td>
<td>0.0001</td>
<td>0.0001</td>
<td>0.0001</td>
<td>0.0003</td>
<td>0.0</td>
<td>0.0619</td>
<td>0.0455</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="8192"></a> 
<img src="8192.png" alt="8192" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="12">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>8192</td><td>802.17</td><td>920.59</td><td>970.07</td><td>1013.18</td><td>1018.57</td><td>1042.62</td><td>1061.99</td><td>1038.68</td><td>1042.59</td><td>1037.88</td><td>980.87</td><td>947.87</td></tr>
<tr><td>8192</td><td>728.46</td><td>852.25</td><td>885.74</td><td>966.29</td><td>935.89</td><td>953.17</td><td>996.99</td><td>1025.88</td><td>986.06</td><td>999.39</td><td>960.38</td><td>934.46</td></tr>
<tr><td>8192</td><td>721.49</td><td>871.37</td><td>928.38</td><td>974.66</td><td>1001.63</td><td>1013.7</td><td>1007.04</td><td>1009.1</td><td>966.63</td><td>996.75</td><td>950.34</td><td>913.25</td></tr>
<tr><td>8192</td><td>742.87</td><td>842.63</td><td>877.68</td><td>955.45</td><td>971.47</td><td>973.95</td><td>935.45</td><td>986.58</td><td>987.66</td><td>1002.77</td><td>967.24</td><td>885.07</td></tr>
<tr><td>8192</td><td>727.99</td><td>844.5</td><td>901.21</td><td>928.38</td><td>926.79</td><td>960.49</td><td>991.68</td><td>957.17</td><td>985.1</td><td>991.07</td><td>935.11</td><td>914.92</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>744.6</td>
<td>866.27</td>
<td>912.62</td>
<td>967.6</td>
<td>970.87</td>
<td>988.79</td>
<td>998.63</td>
<td>1003.48</td>
<td>993.61</td>
<td>1005.57</td>
<td>958.79</td>
<td>919.11</td>
</tr>
<tr>
<td>standard dev.</td>
<td>33.12</td>
<td>32.43</td>
<td>37.49</td>
<td>30.88</td>
<td>39.96</td>
<td>38.11</td>
<td>45.08</td>
<td>32.41</td>
<td>28.69</td>
<td>18.56</td>
<td>17.27</td>
<td>23.84</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>713.02</td>
<td>835.35</td>
<td>876.87</td>
<td>938.15</td>
<td>932.77</td>
<td>952.46</td>
<td>955.65</td>
<td>972.58</td>
<td>966.26</td>
<td>987.88</td>
<td>942.32</td>
<td>896.38</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>776.17</td>
<td>897.18</td>
<td>948.36</td>
<td>997.04</td>
<td>1008.97</td>
<td>1025.12</td>
<td>1041.61</td>
<td>1034.39</td>
<td>1020.96</td>
<td>1023.27</td>
<td>975.26</td>
<td>941.84</td>
</tr>
<tr>
<td>geom. mean</td>
<td>744.03</td>
<td>865.79</td>
<td>912.01</td>
<td>967.2</td>
<td>970.21</td>
<td>988.21</td>
<td>997.82</td>
<td>1003.06</td>
<td>993.28</td>
<td>1005.44</td>
<td>958.66</td>
<td>918.86</td>
</tr>
<tr>
<td>median</td>
<td>728.46</td>
<td>852.25</td>
<td>901.21</td>
<td>966.29</td>
<td>971.47</td>
<td>973.95</td>
<td>996.99</td>
<td>1009.1</td>
<td>986.06</td>
<td>999.39</td>
<td>960.38</td>
<td>914.92</td>
</tr>
<tr>
<td>first quartile</td>
<td>727.99</td>
<td>844.5</td>
<td>885.74</td>
<td>955.45</td>
<td>935.89</td>
<td>960.49</td>
<td>991.68</td>
<td>986.58</td>
<td>985.1</td>
<td>996.75</td>
<td>950.34</td>
<td>913.25</td>
</tr>
<tr>
<td>third quartile</td>
<td>742.87</td>
<td>871.37</td>
<td>928.38</td>
<td>974.66</td>
<td>1001.63</td>
<td>1013.7</td>
<td>1007.04</td>
<td>1025.88</td>
<td>987.66</td>
<td>1002.77</td>
<td>967.24</td>
<td>934.46</td>
</tr>
<tr>
<td>minimum</td>
<td>721.49</td>
<td>842.63</td>
<td>877.68</td>
<td>928.38</td>
<td>926.79</td>
<td>953.17</td>
<td>935.45</td>
<td>957.17</td>
<td>966.63</td>
<td>991.07</td>
<td>935.11</td>
<td>885.07</td>
</tr>
<tr>
<td>maximum</td>
<td>802.17</td>
<td>920.59</td>
<td>970.07</td>
<td>1013.18</td>
<td>1018.57</td>
<td>1042.62</td>
<td>1061.99</td>
<td>1038.68</td>
<td>1042.59</td>
<td>1037.88</td>
<td>980.87</td>
<td>947.87</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>8192</td><td>859.21</td><td>1031.05</td><td>1113.29</td><td>1172.13</td><td>1193.86</td><td>1229.65</td><td>1226.77</td><td>1218.4</td><td>1216.72</td><td>1212.67</td><td>1136.98</td><td>1073.68</td></tr>
<tr><td>8192</td><td>853.33</td><td>985.33</td><td>1066.95</td><td>1101.92</td><td>1185.55</td><td>1188.49</td><td>1192.76</td><td>1230.55</td><td>1226.05</td><td>1188.7</td><td>1115.44</td><td>1057.24</td></tr>
<tr><td>8192</td><td>839.62</td><td>1004.39</td><td>1068.35</td><td>1139.76</td><td>1178.93</td><td>1184.3</td><td>1197.05</td><td>1229.78</td><td>1174.55</td><td>1194.03</td><td>1135.87</td><td>1057.37</td></tr>
<tr><td>8192</td><td>820.42</td><td>996.66</td><td>1076.43</td><td>1163.31</td><td>1208.65</td><td>1165.13</td><td>1189.59</td><td>1191.91</td><td>1238.96</td><td>1206.09</td><td>1141.2</td><td>1076.85</td></tr>
<tr><td>8192</td><td>831.07</td><td>1017.42</td><td>1095.3</td><td>1157.42</td><td>1204.1</td><td>1208.09</td><td>1225.29</td><td>1204.45</td><td>1229.6</td><td>1198.85</td><td>1125.81</td><td>1042.75</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>840.73</td>
<td>1006.97</td>
<td>1084.07</td>
<td>1146.91</td>
<td>1194.22</td>
<td>1195.13</td>
<td>1206.29</td>
<td>1215.02</td>
<td>1217.18</td>
<td>1200.07</td>
<td>1131.06</td>
<td>1061.58</td>
</tr>
<tr>
<td>standard dev.</td>
<td>15.87</td>
<td>17.82</td>
<td>19.87</td>
<td>27.8</td>
<td>12.4</td>
<td>24.6</td>
<td>18.22</td>
<td>16.71</td>
<td>25.12</td>
<td>9.52</td>
<td>10.4</td>
<td>13.88</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>825.6</td>
<td>989.98</td>
<td>1065.13</td>
<td>1120.41</td>
<td>1182.4</td>
<td>1171.68</td>
<td>1188.92</td>
<td>1199.09</td>
<td>1193.23</td>
<td>1191.0</td>
<td>1121.14</td>
<td>1048.34</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>855.86</td>
<td>1023.96</td>
<td>1103.01</td>
<td>1173.41</td>
<td>1206.04</td>
<td>1218.58</td>
<td>1223.66</td>
<td>1230.95</td>
<td>1241.13</td>
<td>1209.14</td>
<td>1140.97</td>
<td>1074.81</td>
</tr>
<tr>
<td>geom. mean</td>
<td>840.61</td>
<td>1006.85</td>
<td>1083.92</td>
<td>1146.64</td>
<td>1194.17</td>
<td>1194.93</td>
<td>1206.18</td>
<td>1214.93</td>
<td>1216.97</td>
<td>1200.04</td>
<td>1131.02</td>
<td>1061.5</td>
</tr>
<tr>
<td>median</td>
<td>839.62</td>
<td>1004.39</td>
<td>1076.43</td>
<td>1157.42</td>
<td>1193.86</td>
<td>1188.49</td>
<td>1197.05</td>
<td>1218.4</td>
<td>1226.05</td>
<td>1198.85</td>
<td>1135.87</td>
<td>1057.37</td>
</tr>
<tr>
<td>first quartile</td>
<td>831.07</td>
<td>996.66</td>
<td>1068.35</td>
<td>1139.76</td>
<td>1185.55</td>
<td>1184.3</td>
<td>1192.76</td>
<td>1204.45</td>
<td>1216.72</td>
<td>1194.03</td>
<td>1125.81</td>
<td>1057.24</td>
</tr>
<tr>
<td>third quartile</td>
<td>853.33</td>
<td>1017.42</td>
<td>1095.3</td>
<td>1163.31</td>
<td>1204.1</td>
<td>1208.09</td>
<td>1225.29</td>
<td>1229.78</td>
<td>1229.6</td>
<td>1206.09</td>
<td>1136.98</td>
<td>1073.68</td>
</tr>
<tr>
<td>minimum</td>
<td>820.42</td>
<td>985.33</td>
<td>1066.95</td>
<td>1101.92</td>
<td>1178.93</td>
<td>1165.13</td>
<td>1189.59</td>
<td>1191.91</td>
<td>1174.55</td>
<td>1188.7</td>
<td>1115.44</td>
<td>1042.75</td>
</tr>
<tr>
<td>maximum</td>
<td>859.21</td>
<td>1031.05</td>
<td>1113.29</td>
<td>1172.13</td>
<td>1208.65</td>
<td>1229.65</td>
<td>1226.77</td>
<td>1230.55</td>
<td>1238.96</td>
<td>1212.67</td>
<td>1141.2</td>
<td>1076.85</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>12.91 % </td>
<td>16.24 % </td>
<td>18.79 % </td>
<td>18.53 % </td>
<td>23.0 % </td>
<td>20.87 % </td>
<td>20.79 % </td>
<td>21.08 % </td>
<td>22.5 % </td>
<td>19.34 % </td>
<td>17.97 % </td>
<td>15.5 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0004</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="16384"></a> 
<img src="16384.png" alt="16384" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="13">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>16384</td><td>790.35</td><td>903.65</td><td>971.64</td><td>1030.61</td><td>1033.67</td><td>1031.99</td><td>1047.4</td><td>1049.94</td><td>1032.72</td><td>1022.12</td><td>975.25</td><td>957.51</td><td>941.01</td></tr>
<tr><td>16384</td><td>756.29</td><td>880.37</td><td>913.04</td><td>966.29</td><td>1003.71</td><td>1011.0</td><td>1018.21</td><td>1009.52</td><td>1017.62</td><td>990.35</td><td>957.8</td><td>916.48</td><td>922.35</td></tr>
<tr><td>16384</td><td>751.7</td><td>870.37</td><td>926.73</td><td>971.16</td><td>999.0</td><td>1007.49</td><td>1017.24</td><td>1021.12</td><td>998.75</td><td>1008.88</td><td>951.13</td><td>930.22</td><td>904.46</td></tr>
<tr><td>16384</td><td>755.61</td><td>873.08</td><td>919.6</td><td>958.77</td><td>974.25</td><td>980.28</td><td>1002.57</td><td>1012.08</td><td>994.03</td><td>999.12</td><td>950.34</td><td>917.74</td><td>929.1</td></tr>
<tr><td>16384</td><td>749.8</td><td>840.68</td><td>899.13</td><td>958.95</td><td>951.02</td><td>951.59</td><td>1003.83</td><td>990.47</td><td>995.33</td><td>1000.19</td><td>950.92</td><td>890.37</td><td>913.45</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>760.75</td>
<td>873.63</td>
<td>926.03</td>
<td>977.16</td>
<td>992.33</td>
<td>996.47</td>
<td>1017.85</td>
<td>1016.63</td>
<td>1007.69</td>
<td>1004.13</td>
<td>957.09</td>
<td>922.46</td>
<td>922.07</td>
</tr>
<tr>
<td>standard dev.</td>
<td>16.77</td>
<td>22.6</td>
<td>27.45</td>
<td>30.33</td>
<td>31.29</td>
<td>31.11</td>
<td>18.05</td>
<td>21.71</td>
<td>16.91</td>
<td>12.01</td>
<td>10.6</td>
<td>24.37</td>
<td>14.08</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>744.76</td>
<td>852.08</td>
<td>899.85</td>
<td>948.23</td>
<td>962.5</td>
<td>966.81</td>
<td>1000.64</td>
<td>995.93</td>
<td>991.56</td>
<td>992.69</td>
<td>946.98</td>
<td>899.23</td>
<td>908.65</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>776.74</td>
<td>895.18</td>
<td>952.2</td>
<td>1006.08</td>
<td>1022.16</td>
<td>1026.13</td>
<td>1035.06</td>
<td>1037.33</td>
<td>1023.81</td>
<td>1015.58</td>
<td>967.19</td>
<td>945.7</td>
<td>935.49</td>
</tr>
<tr>
<td>geom. mean</td>
<td>760.6</td>
<td>873.4</td>
<td>925.71</td>
<td>976.79</td>
<td>991.94</td>
<td>996.08</td>
<td>1017.72</td>
<td>1016.44</td>
<td>1007.58</td>
<td>1004.08</td>
<td>957.04</td>
<td>922.21</td>
<td>921.99</td>
</tr>
<tr>
<td>median</td>
<td>755.61</td>
<td>873.08</td>
<td>919.6</td>
<td>966.29</td>
<td>999.0</td>
<td>1007.49</td>
<td>1017.24</td>
<td>1012.08</td>
<td>998.75</td>
<td>1000.19</td>
<td>951.13</td>
<td>917.74</td>
<td>922.35</td>
</tr>
<tr>
<td>first quartile</td>
<td>751.7</td>
<td>870.37</td>
<td>913.04</td>
<td>958.95</td>
<td>974.25</td>
<td>980.28</td>
<td>1003.83</td>
<td>1009.52</td>
<td>995.33</td>
<td>999.12</td>
<td>950.92</td>
<td>916.48</td>
<td>913.45</td>
</tr>
<tr>
<td>third quartile</td>
<td>756.29</td>
<td>880.37</td>
<td>926.73</td>
<td>971.16</td>
<td>1003.71</td>
<td>1011.0</td>
<td>1018.21</td>
<td>1021.12</td>
<td>1017.62</td>
<td>1008.88</td>
<td>957.8</td>
<td>930.22</td>
<td>929.1</td>
</tr>
<tr>
<td>minimum</td>
<td>749.8</td>
<td>840.68</td>
<td>899.13</td>
<td>958.77</td>
<td>951.02</td>
<td>951.59</td>
<td>1002.57</td>
<td>990.47</td>
<td>994.03</td>
<td>990.35</td>
<td>950.34</td>
<td>890.37</td>
<td>904.46</td>
</tr>
<tr>
<td>maximum</td>
<td>790.35</td>
<td>903.65</td>
<td>971.64</td>
<td>1030.61</td>
<td>1033.67</td>
<td>1031.99</td>
<td>1047.4</td>
<td>1049.94</td>
<td>1032.72</td>
<td>1022.12</td>
<td>975.25</td>
<td>957.51</td>
<td>941.01</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>16384</td><td>853.57</td><td>1020.34</td><td>1123.84</td><td>1166.61</td><td>1203.28</td><td>1173.79</td><td>1210.46</td><td>1230.12</td><td>1233.03</td><td>1234.37</td><td>1117.55</td><td>1079.69</td><td>1065.04</td></tr>
<tr><td>16384</td><td>826.78</td><td>1003.45</td><td>1103.99</td><td>1172.58</td><td>1181.41</td><td>1198.23</td><td>1201.92</td><td>1206.63</td><td>1227.26</td><td>1209.11</td><td>1125.33</td><td>1068.17</td><td>1060.02</td></tr>
<tr><td>16384</td><td>864.07</td><td>1010.88</td><td>1093.11</td><td>1174.84</td><td>1204.72</td><td>1199.66</td><td>1233.03</td><td>1230.57</td><td>1228.2</td><td>1228.77</td><td>1140.17</td><td>1088.58</td><td>1085.85</td></tr>
<tr><td>16384</td><td>843.62</td><td>1015.86</td><td>1089.47</td><td>1152.66</td><td>1198.33</td><td>1219.15</td><td>1193.77</td><td>1240.39</td><td>1232.38</td><td>1210.85</td><td>1108.42</td><td>1063.33</td><td>1063.26</td></tr>
<tr><td>16384</td><td>852.65</td><td>999.76</td><td>1105.8</td><td>1163.21</td><td>1208.28</td><td>1229.44</td><td>1211.77</td><td>1208.56</td><td>1240.0</td><td>1203.36</td><td>1137.02</td><td>1095.82</td><td>1074.11</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>848.14</td>
<td>1010.06</td>
<td>1103.24</td>
<td>1165.98</td>
<td>1199.21</td>
<td>1204.05</td>
<td>1210.19</td>
<td>1223.25</td>
<td>1232.18</td>
<td>1217.29</td>
<td>1125.7</td>
<td>1079.12</td>
<td>1069.66</td>
</tr>
<tr>
<td>standard dev.</td>
<td>13.97</td>
<td>8.51</td>
<td>13.45</td>
<td>8.77</td>
<td>10.57</td>
<td>21.46</td>
<td>14.68</td>
<td>14.89</td>
<td>5.05</td>
<td>13.47</td>
<td>13.25</td>
<td>13.58</td>
<td>10.45</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>834.82</td>
<td>1001.94</td>
<td>1090.42</td>
<td>1157.62</td>
<td>1189.13</td>
<td>1183.6</td>
<td>1196.19</td>
<td>1209.06</td>
<td>1227.36</td>
<td>1204.45</td>
<td>1113.06</td>
<td>1066.17</td>
<td>1059.69</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>861.45</td>
<td>1018.18</td>
<td>1116.07</td>
<td>1174.34</td>
<td>1209.28</td>
<td>1224.51</td>
<td>1224.19</td>
<td>1237.45</td>
<td>1236.99</td>
<td>1230.13</td>
<td>1138.33</td>
<td>1092.07</td>
<td>1079.62</td>
</tr>
<tr>
<td>geom. mean</td>
<td>848.05</td>
<td>1010.03</td>
<td>1103.18</td>
<td>1165.95</td>
<td>1199.17</td>
<td>1203.9</td>
<td>1210.12</td>
<td>1223.18</td>
<td>1232.17</td>
<td>1217.23</td>
<td>1125.63</td>
<td>1079.05</td>
<td>1069.62</td>
</tr>
<tr>
<td>median</td>
<td>852.65</td>
<td>1010.88</td>
<td>1103.99</td>
<td>1166.61</td>
<td>1203.28</td>
<td>1199.66</td>
<td>1210.46</td>
<td>1230.12</td>
<td>1232.38</td>
<td>1210.85</td>
<td>1125.33</td>
<td>1079.69</td>
<td>1065.04</td>
</tr>
<tr>
<td>first quartile</td>
<td>843.62</td>
<td>1003.45</td>
<td>1093.11</td>
<td>1163.21</td>
<td>1198.33</td>
<td>1198.23</td>
<td>1201.92</td>
<td>1208.56</td>
<td>1228.2</td>
<td>1209.11</td>
<td>1117.55</td>
<td>1068.17</td>
<td>1063.26</td>
</tr>
<tr>
<td>third quartile</td>
<td>853.57</td>
<td>1015.86</td>
<td>1105.8</td>
<td>1172.58</td>
<td>1204.72</td>
<td>1219.15</td>
<td>1211.77</td>
<td>1230.57</td>
<td>1233.03</td>
<td>1228.77</td>
<td>1137.02</td>
<td>1088.58</td>
<td>1074.11</td>
</tr>
<tr>
<td>minimum</td>
<td>826.78</td>
<td>999.76</td>
<td>1089.47</td>
<td>1152.66</td>
<td>1181.41</td>
<td>1173.79</td>
<td>1193.77</td>
<td>1206.63</td>
<td>1227.26</td>
<td>1203.36</td>
<td>1108.42</td>
<td>1063.33</td>
<td>1060.02</td>
</tr>
<tr>
<td>maximum</td>
<td>864.07</td>
<td>1020.34</td>
<td>1123.84</td>
<td>1174.84</td>
<td>1208.28</td>
<td>1229.44</td>
<td>1233.03</td>
<td>1240.39</td>
<td>1240.0</td>
<td>1234.37</td>
<td>1140.17</td>
<td>1095.82</td>
<td>1085.85</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>11.49 % </td>
<td>15.62 % </td>
<td>19.14 % </td>
<td>19.32 % </td>
<td>20.85 % </td>
<td>20.83 % </td>
<td>18.9 % </td>
<td>20.32 % </td>
<td>22.28 % </td>
<td>21.23 % </td>
<td>17.62 % </td>
<td>16.98 % </td>
<td>16.01 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="32768"></a> 
<img src="32768.png" alt="32768" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>32768</td><td>1047.74</td><td>1047.94</td><td>1038.05</td><td>1058.79</td><td>1055.37</td><td>1036.03</td><td>985.77</td><td>948.99</td><td>950.06</td></tr>
<tr><td>32768</td><td>1016.01</td><td>1006.54</td><td>997.63</td><td>1022.75</td><td>1033.03</td><td>1025.02</td><td>958.12</td><td>932.05</td><td>918.12</td></tr>
<tr><td>32768</td><td>1015.64</td><td>983.32</td><td>991.47</td><td>1002.76</td><td>1013.52</td><td>1011.22</td><td>956.14</td><td>919.38</td><td>925.98</td></tr>
<tr><td>32768</td><td>987.99</td><td>999.94</td><td>999.9</td><td>1013.81</td><td>1003.89</td><td>1019.2</td><td>948.15</td><td>924.67</td><td>911.5</td></tr>
<tr><td>32768</td><td>989.0</td><td>988.69</td><td>975.58</td><td>1020.28</td><td>1020.86</td><td>1000.94</td><td>953.09</td><td>921.16</td><td>926.86</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1011.28</td>
<td>1005.28</td>
<td>1000.53</td>
<td>1023.68</td>
<td>1025.33</td>
<td>1018.48</td>
<td>960.25</td>
<td>929.25</td>
<td>926.5</td>
</tr>
<tr>
<td>standard dev.</td>
<td>24.55</td>
<td>25.53</td>
<td>23.03</td>
<td>21.1</td>
<td>19.88</td>
<td>13.34</td>
<td>14.75</td>
<td>12.06</td>
<td>14.58</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>987.87</td>
<td>980.94</td>
<td>978.57</td>
<td>1003.57</td>
<td>1006.38</td>
<td>1005.76</td>
<td>946.19</td>
<td>917.75</td>
<td>912.6</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1034.68</td>
<td>1029.63</td>
<td>1022.48</td>
<td>1043.79</td>
<td>1044.29</td>
<td>1031.2</td>
<td>974.31</td>
<td>940.74</td>
<td>940.41</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1011.04</td>
<td>1005.03</td>
<td>1000.32</td>
<td>1023.51</td>
<td>1025.18</td>
<td>1018.41</td>
<td>960.16</td>
<td>929.19</td>
<td>926.41</td>
</tr>
<tr>
<td>median</td>
<td>1015.64</td>
<td>999.94</td>
<td>997.63</td>
<td>1020.28</td>
<td>1020.86</td>
<td>1019.2</td>
<td>956.14</td>
<td>924.67</td>
<td>925.98</td>
</tr>
<tr>
<td>first quartile</td>
<td>989.0</td>
<td>988.69</td>
<td>991.47</td>
<td>1013.81</td>
<td>1013.52</td>
<td>1011.22</td>
<td>953.09</td>
<td>921.16</td>
<td>918.12</td>
</tr>
<tr>
<td>third quartile</td>
<td>1016.01</td>
<td>1006.54</td>
<td>999.9</td>
<td>1022.75</td>
<td>1033.03</td>
<td>1025.02</td>
<td>958.12</td>
<td>932.05</td>
<td>926.86</td>
</tr>
<tr>
<td>minimum</td>
<td>987.99</td>
<td>983.32</td>
<td>975.58</td>
<td>1002.76</td>
<td>1003.89</td>
<td>1000.94</td>
<td>948.15</td>
<td>919.38</td>
<td>911.5</td>
</tr>
<tr>
<td>maximum</td>
<td>1047.74</td>
<td>1047.94</td>
<td>1038.05</td>
<td>1058.79</td>
<td>1055.37</td>
<td>1036.03</td>
<td>985.77</td>
<td>948.99</td>
<td>950.06</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>32768</td><td>1224.78</td><td>1234.33</td><td>1237.57</td><td>1245.09</td><td>1242.29</td><td>1234.19</td><td>1127.28</td><td>1077.19</td><td>1082.8</td></tr>
<tr><td>32768</td><td>1203.74</td><td>1213.96</td><td>1221.65</td><td>1241.95</td><td>1230.49</td><td>1224.4</td><td>1115.68</td><td>1083.94</td><td>1068.88</td></tr>
<tr><td>32768</td><td>1206.55</td><td>1213.54</td><td>1224.22</td><td>1242.33</td><td>1235.01</td><td>1229.44</td><td>1152.28</td><td>1103.67</td><td>1083.97</td></tr>
<tr><td>32768</td><td>1215.11</td><td>1209.97</td><td>1226.85</td><td>1223.95</td><td>1235.33</td><td>1203.33</td><td>1138.07</td><td>1081.04</td><td>1084.6</td></tr>
<tr><td>32768</td><td>1198.28</td><td>1223.43</td><td>1227.42</td><td>1234.9</td><td>1236.67</td><td>1212.76</td><td>1131.58</td><td>1086.62</td><td>1075.48</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1209.69</td>
<td>1219.05</td>
<td>1227.54</td>
<td>1237.64</td>
<td>1235.96</td>
<td>1220.82</td>
<td>1132.98</td>
<td>1086.49</td>
<td>1079.15</td>
</tr>
<tr>
<td>standard dev.</td>
<td>10.4</td>
<td>9.89</td>
<td>6.06</td>
<td>8.53</td>
<td>4.24</td>
<td>12.62</td>
<td>13.53</td>
<td>10.22</td>
<td>6.8</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1199.78</td>
<td>1209.61</td>
<td>1221.77</td>
<td>1229.51</td>
<td>1231.92</td>
<td>1208.8</td>
<td>1120.08</td>
<td>1076.75</td>
<td>1072.66</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1219.61</td>
<td>1228.48</td>
<td>1233.32</td>
<td>1245.78</td>
<td>1240.0</td>
<td>1232.85</td>
<td>1145.88</td>
<td>1096.24</td>
<td>1085.63</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1209.66</td>
<td>1219.02</td>
<td>1227.53</td>
<td>1237.62</td>
<td>1235.95</td>
<td>1220.77</td>
<td>1132.91</td>
<td>1086.45</td>
<td>1079.13</td>
</tr>
<tr>
<td>median</td>
<td>1206.55</td>
<td>1213.96</td>
<td>1226.85</td>
<td>1241.95</td>
<td>1235.33</td>
<td>1224.4</td>
<td>1131.58</td>
<td>1083.94</td>
<td>1082.8</td>
</tr>
<tr>
<td>first quartile</td>
<td>1203.74</td>
<td>1213.54</td>
<td>1224.22</td>
<td>1234.9</td>
<td>1235.01</td>
<td>1212.76</td>
<td>1127.28</td>
<td>1081.04</td>
<td>1075.48</td>
</tr>
<tr>
<td>third quartile</td>
<td>1215.11</td>
<td>1223.43</td>
<td>1227.42</td>
<td>1242.33</td>
<td>1236.67</td>
<td>1229.44</td>
<td>1138.07</td>
<td>1086.62</td>
<td>1083.97</td>
</tr>
<tr>
<td>minimum</td>
<td>1198.28</td>
<td>1209.97</td>
<td>1221.65</td>
<td>1223.95</td>
<td>1230.49</td>
<td>1203.33</td>
<td>1115.68</td>
<td>1077.19</td>
<td>1068.88</td>
</tr>
<tr>
<td>maximum</td>
<td>1224.78</td>
<td>1234.33</td>
<td>1237.57</td>
<td>1245.09</td>
<td>1242.29</td>
<td>1234.19</td>
<td>1152.28</td>
<td>1103.67</td>
<td>1084.6</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>19.62 % </td>
<td>21.26 % </td>
<td>22.69 % </td>
<td>20.9 % </td>
<td>20.54 % </td>
<td>19.87 % </td>
<td>17.99 % </td>
<td>16.92 % </td>
<td>16.48 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="65536"></a> 
<img src="65536.png" alt="65536" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>65536</td><td>1037.06</td><td>1035.56</td><td>1040.09</td><td>1052.39</td><td>1054.09</td><td>1046.95</td><td>976.26</td><td>949.83</td><td>959.97</td></tr>
<tr><td>65536</td><td>1014.09</td><td>1021.81</td><td>1025.94</td><td>1023.64</td><td>1010.85</td><td>1018.83</td><td>944.4</td><td>935.99</td><td>943.38</td></tr>
<tr><td>65536</td><td>1002.13</td><td>998.7</td><td>1006.87</td><td>1001.55</td><td>1025.53</td><td>1016.74</td><td>939.26</td><td>939.95</td><td>919.7</td></tr>
<tr><td>65536</td><td>1008.54</td><td>1013.47</td><td>1014.34</td><td>1014.7</td><td>1012.22</td><td>1016.47</td><td>955.65</td><td>926.88</td><td>930.19</td></tr>
<tr><td>65536</td><td>996.92</td><td>1000.03</td><td>1018.93</td><td>1025.15</td><td>1024.97</td><td>1013.09</td><td>943.87</td><td>921.29</td><td>920.9</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1011.75</td>
<td>1013.92</td>
<td>1021.23</td>
<td>1023.48</td>
<td>1025.53</td>
<td>1022.42</td>
<td>951.89</td>
<td>934.79</td>
<td>934.83</td>
</tr>
<tr>
<td>standard dev.</td>
<td>15.56</td>
<td>15.45</td>
<td>12.62</td>
<td>18.69</td>
<td>17.38</td>
<td>13.87</td>
<td>14.9</td>
<td>11.17</td>
<td>16.95</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>996.91</td>
<td>999.18</td>
<td>1009.21</td>
<td>1005.67</td>
<td>1008.96</td>
<td>1009.2</td>
<td>937.68</td>
<td>924.13</td>
<td>918.67</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1026.58</td>
<td>1028.65</td>
<td>1033.26</td>
<td>1041.3</td>
<td>1042.1</td>
<td>1035.64</td>
<td>966.09</td>
<td>945.44</td>
<td>950.99</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1011.65</td>
<td>1013.82</td>
<td>1021.17</td>
<td>1023.35</td>
<td>1025.41</td>
<td>1022.34</td>
<td>951.79</td>
<td>934.73</td>
<td>934.71</td>
</tr>
<tr>
<td>median</td>
<td>1008.54</td>
<td>1013.47</td>
<td>1018.93</td>
<td>1023.64</td>
<td>1024.97</td>
<td>1016.74</td>
<td>944.4</td>
<td>935.99</td>
<td>930.19</td>
</tr>
<tr>
<td>first quartile</td>
<td>1002.13</td>
<td>1000.03</td>
<td>1014.34</td>
<td>1014.7</td>
<td>1012.22</td>
<td>1016.47</td>
<td>943.87</td>
<td>926.88</td>
<td>920.9</td>
</tr>
<tr>
<td>third quartile</td>
<td>1014.09</td>
<td>1021.81</td>
<td>1025.94</td>
<td>1025.15</td>
<td>1025.53</td>
<td>1018.83</td>
<td>955.65</td>
<td>939.95</td>
<td>943.38</td>
</tr>
<tr>
<td>minimum</td>
<td>996.92</td>
<td>998.7</td>
<td>1006.87</td>
<td>1001.55</td>
<td>1010.85</td>
<td>1013.09</td>
<td>939.26</td>
<td>921.29</td>
<td>919.7</td>
</tr>
<tr>
<td>maximum</td>
<td>1037.06</td>
<td>1035.56</td>
<td>1040.09</td>
<td>1052.39</td>
<td>1054.09</td>
<td>1046.95</td>
<td>976.26</td>
<td>949.83</td>
<td>959.97</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>65536</td><td>1217.05</td><td>1228.85</td><td>1216.34</td><td>1244.68</td><td>1233.95</td><td>1236.17</td><td>1135.84</td><td>1098.67</td><td>1101.49</td></tr>
<tr><td>65536</td><td>1217.58</td><td>1216.75</td><td>1233.67</td><td>1218.4</td><td>1233.99</td><td>1221.54</td><td>1134.01</td><td>1094.22</td><td>1091.81</td></tr>
<tr><td>65536</td><td>1209.65</td><td>1198.73</td><td>1230.67</td><td>1230.61</td><td>1235.61</td><td>1227.37</td><td>1116.23</td><td>1096.92</td><td>1107.65</td></tr>
<tr><td>65536</td><td>1201.72</td><td>1216.03</td><td>1236.88</td><td>1228.93</td><td>1252.2</td><td>1226.88</td><td>1147.55</td><td>1084.69</td><td>1096.17</td></tr>
<tr><td>65536</td><td>1217.52</td><td>1222.45</td><td>1223.62</td><td>1222.56</td><td>1222.75</td><td>1231.86</td><td>1124.58</td><td>1090.72</td><td>1093.61</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1212.7</td>
<td>1216.56</td>
<td>1228.23</td>
<td>1229.03</td>
<td>1235.7</td>
<td>1228.76</td>
<td>1131.64</td>
<td>1093.04</td>
<td>1098.15</td>
</tr>
<tr>
<td>standard dev.</td>
<td>7.0</td>
<td>11.23</td>
<td>8.26</td>
<td>10.03</td>
<td>10.56</td>
<td>5.53</td>
<td>11.87</td>
<td>5.55</td>
<td>6.44</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1206.03</td>
<td>1205.86</td>
<td>1220.36</td>
<td>1219.47</td>
<td>1225.63</td>
<td>1223.49</td>
<td>1120.32</td>
<td>1087.75</td>
<td>1092.0</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1219.38</td>
<td>1227.27</td>
<td>1236.11</td>
<td>1238.59</td>
<td>1245.77</td>
<td>1234.03</td>
<td>1142.96</td>
<td>1098.34</td>
<td>1104.29</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1212.69</td>
<td>1216.52</td>
<td>1228.21</td>
<td>1229.0</td>
<td>1235.66</td>
<td>1228.75</td>
<td>1131.59</td>
<td>1093.03</td>
<td>1098.13</td>
</tr>
<tr>
<td>median</td>
<td>1217.05</td>
<td>1216.75</td>
<td>1230.67</td>
<td>1228.93</td>
<td>1233.99</td>
<td>1227.37</td>
<td>1134.01</td>
<td>1094.22</td>
<td>1096.17</td>
</tr>
<tr>
<td>first quartile</td>
<td>1209.65</td>
<td>1216.03</td>
<td>1223.62</td>
<td>1222.56</td>
<td>1233.95</td>
<td>1226.88</td>
<td>1124.58</td>
<td>1090.72</td>
<td>1093.61</td>
</tr>
<tr>
<td>third quartile</td>
<td>1217.52</td>
<td>1222.45</td>
<td>1233.67</td>
<td>1230.61</td>
<td>1235.61</td>
<td>1231.86</td>
<td>1135.84</td>
<td>1096.92</td>
<td>1101.49</td>
</tr>
<tr>
<td>minimum</td>
<td>1201.72</td>
<td>1198.73</td>
<td>1216.34</td>
<td>1218.4</td>
<td>1222.75</td>
<td>1221.54</td>
<td>1116.23</td>
<td>1084.69</td>
<td>1091.81</td>
</tr>
<tr>
<td>maximum</td>
<td>1217.58</td>
<td>1228.85</td>
<td>1236.88</td>
<td>1244.68</td>
<td>1252.2</td>
<td>1236.17</td>
<td>1147.55</td>
<td>1098.67</td>
<td>1107.65</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>19.86 % </td>
<td>19.99 % </td>
<td>20.27 % </td>
<td>20.08 % </td>
<td>20.49 % </td>
<td>20.18 % </td>
<td>18.88 % </td>
<td>16.93 % </td>
<td>17.47 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="131072"></a> 
<img src="131072.png" alt="131072" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>131072</td><td>1030.4</td><td>1040.5</td><td>1048.03</td><td>1055.67</td><td>1046.77</td><td>1040.13</td><td>977.74</td><td>949.42</td><td>954.28</td></tr>
<tr><td>131072</td><td>1021.08</td><td>1012.27</td><td>1028.34</td><td>1016.43</td><td>1035.42</td><td>1016.81</td><td>962.41</td><td>923.91</td><td>936.4</td></tr>
<tr><td>131072</td><td>1012.41</td><td>994.04</td><td>1009.12</td><td>1015.91</td><td>1017.58</td><td>1018.12</td><td>947.78</td><td>936.54</td><td>955.12</td></tr>
<tr><td>131072</td><td>1000.01</td><td>1004.31</td><td>1000.41</td><td>1029.09</td><td>1030.84</td><td>1017.63</td><td>1013.53</td><td>920.88</td><td>916.96</td></tr>
<tr><td>131072</td><td>1011.26</td><td>980.29</td><td>1008.05</td><td>1010.82</td><td>1008.52</td><td>1019.84</td><td>952.69</td><td>923.83</td><td>931.13</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1015.03</td>
<td>1006.28</td>
<td>1018.79</td>
<td>1025.58</td>
<td>1027.82</td>
<td>1022.51</td>
<td>970.83</td>
<td>930.92</td>
<td>938.78</td>
</tr>
<tr>
<td>standard dev.</td>
<td>11.4</td>
<td>22.56</td>
<td>19.32</td>
<td>18.12</td>
<td>15.03</td>
<td>9.92</td>
<td>26.47</td>
<td>11.98</td>
<td>16.18</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1004.17</td>
<td>984.77</td>
<td>1000.38</td>
<td>1008.31</td>
<td>1013.5</td>
<td>1013.05</td>
<td>945.59</td>
<td>919.5</td>
<td>923.35</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1025.9</td>
<td>1027.79</td>
<td>1037.21</td>
<td>1042.86</td>
<td>1042.15</td>
<td>1031.96</td>
<td>996.07</td>
<td>942.34</td>
<td>954.2</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1014.98</td>
<td>1006.08</td>
<td>1018.65</td>
<td>1025.46</td>
<td>1027.74</td>
<td>1022.47</td>
<td>970.54</td>
<td>930.86</td>
<td>938.66</td>
</tr>
<tr>
<td>median</td>
<td>1012.41</td>
<td>1004.31</td>
<td>1009.12</td>
<td>1016.43</td>
<td>1030.84</td>
<td>1018.12</td>
<td>962.41</td>
<td>923.91</td>
<td>936.4</td>
</tr>
<tr>
<td>first quartile</td>
<td>1011.26</td>
<td>994.04</td>
<td>1008.05</td>
<td>1015.91</td>
<td>1017.58</td>
<td>1017.63</td>
<td>952.69</td>
<td>923.83</td>
<td>931.13</td>
</tr>
<tr>
<td>third quartile</td>
<td>1021.08</td>
<td>1012.27</td>
<td>1028.34</td>
<td>1029.09</td>
<td>1035.42</td>
<td>1019.84</td>
<td>977.74</td>
<td>936.54</td>
<td>954.28</td>
</tr>
<tr>
<td>minimum</td>
<td>1000.01</td>
<td>980.29</td>
<td>1000.41</td>
<td>1010.82</td>
<td>1008.52</td>
<td>1016.81</td>
<td>947.78</td>
<td>920.88</td>
<td>916.96</td>
</tr>
<tr>
<td>maximum</td>
<td>1030.4</td>
<td>1040.5</td>
<td>1048.03</td>
<td>1055.67</td>
<td>1046.77</td>
<td>1040.13</td>
<td>1013.53</td>
<td>949.42</td>
<td>955.12</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>131072</td><td>1204.98</td><td>1222.81</td><td>1226.53</td><td>1250.1</td><td>1259.3</td><td>1249.18</td><td>1144.15</td><td>1100.34</td><td>1107.7</td></tr>
<tr><td>131072</td><td>1209.63</td><td>1206.53</td><td>1223.35</td><td>1235.81</td><td>1241.31</td><td>1231.58</td><td>1134.94</td><td>1084.92</td><td>1086.96</td></tr>
<tr><td>131072</td><td>1203.91</td><td>1224.95</td><td>1234.38</td><td>1243.88</td><td>1245.48</td><td>1249.12</td><td>1152.18</td><td>1100.21</td><td>1106.41</td></tr>
<tr><td>131072</td><td>1217.7</td><td>1225.03</td><td>1227.57</td><td>1236.65</td><td>1247.42</td><td>1243.1</td><td>1144.36</td><td>1096.42</td><td>1094.92</td></tr>
<tr><td>131072</td><td>1212.57</td><td>1207.44</td><td>1220.2</td><td>1240.43</td><td>1232.57</td><td>1242.75</td><td>1137.57</td><td>1098.79</td><td>1094.19</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1209.76</td>
<td>1217.35</td>
<td>1226.41</td>
<td>1241.37</td>
<td>1245.21</td>
<td>1243.15</td>
<td>1142.64</td>
<td>1096.13</td>
<td>1098.03</td>
</tr>
<tr>
<td>standard dev.</td>
<td>5.66</td>
<td>9.51</td>
<td>5.31</td>
<td>5.84</td>
<td>9.73</td>
<td>7.18</td>
<td>6.73</td>
<td>6.46</td>
<td>8.82</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1204.37</td>
<td>1208.29</td>
<td>1221.34</td>
<td>1235.8</td>
<td>1235.94</td>
<td>1236.3</td>
<td>1136.22</td>
<td>1089.97</td>
<td>1089.63</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1215.15</td>
<td>1226.42</td>
<td>1231.47</td>
<td>1246.94</td>
<td>1254.49</td>
<td>1249.99</td>
<td>1149.05</td>
<td>1102.3</td>
<td>1106.44</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1209.75</td>
<td>1217.32</td>
<td>1226.4</td>
<td>1241.36</td>
<td>1245.18</td>
<td>1243.13</td>
<td>1142.62</td>
<td>1096.12</td>
<td>1098.01</td>
</tr>
<tr>
<td>median</td>
<td>1209.63</td>
<td>1222.81</td>
<td>1226.53</td>
<td>1240.43</td>
<td>1245.48</td>
<td>1243.1</td>
<td>1144.15</td>
<td>1098.79</td>
<td>1094.92</td>
</tr>
<tr>
<td>first quartile</td>
<td>1204.98</td>
<td>1207.44</td>
<td>1223.35</td>
<td>1236.65</td>
<td>1241.31</td>
<td>1242.75</td>
<td>1137.57</td>
<td>1096.42</td>
<td>1094.19</td>
</tr>
<tr>
<td>third quartile</td>
<td>1212.57</td>
<td>1224.95</td>
<td>1227.57</td>
<td>1243.88</td>
<td>1247.42</td>
<td>1249.12</td>
<td>1144.36</td>
<td>1100.21</td>
<td>1106.41</td>
</tr>
<tr>
<td>minimum</td>
<td>1203.91</td>
<td>1206.53</td>
<td>1220.2</td>
<td>1235.81</td>
<td>1232.57</td>
<td>1231.58</td>
<td>1134.94</td>
<td>1084.92</td>
<td>1086.96</td>
</tr>
<tr>
<td>maximum</td>
<td>1217.7</td>
<td>1225.03</td>
<td>1234.38</td>
<td>1250.1</td>
<td>1259.3</td>
<td>1249.18</td>
<td>1152.18</td>
<td>1100.34</td>
<td>1107.7</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>19.18 % </td>
<td>20.98 % </td>
<td>20.38 % </td>
<td>21.04 % </td>
<td>21.15 % </td>
<td>21.58 % </td>
<td>17.7 % </td>
<td>17.75 % </td>
<td>16.96 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="262144"></a> 
<img src="262144.png" alt="262144" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>262144</td><td>1147.93</td><td>1071.71</td><td>1302.35</td><td>1058.07</td><td>1247.23</td><td>1300.42</td><td>1028.16</td><td>1075.62</td><td>984.69</td></tr>
<tr><td>262144</td><td>1027.46</td><td>1028.81</td><td>1093.25</td><td>1078.72</td><td>1246.5</td><td>1050.97</td><td>1042.31</td><td>1140.7</td><td>1011.22</td></tr>
<tr><td>262144</td><td>1230.73</td><td>1124.8</td><td>1032.71</td><td>1130.22</td><td>1081.81</td><td>1056.0</td><td>1023.73</td><td>1116.48</td><td>1076.86</td></tr>
<tr><td>262144</td><td>1147.68</td><td>1209.51</td><td>1250.59</td><td>1064.77</td><td>1255.66</td><td>1029.58</td><td>1116.01</td><td>995.1</td><td>1014.24</td></tr>
<tr><td>262144</td><td>1183.23</td><td>1197.08</td><td>1272.09</td><td>1034.81</td><td>1212.52</td><td>1309.81</td><td>1053.4</td><td>1033.44</td><td>1136.29</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1147.41</td>
<td>1126.38</td>
<td>1190.2</td>
<td>1073.32</td>
<td>1208.74</td>
<td>1149.36</td>
<td>1052.72</td>
<td>1072.27</td>
<td>1044.66</td>
</tr>
<tr>
<td>standard dev.</td>
<td>75.19</td>
<td>78.13</td>
<td>119.51</td>
<td>35.55</td>
<td>72.86</td>
<td>142.57</td>
<td>37.27</td>
<td>59.4</td>
<td>61.38</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1075.72</td>
<td>1051.89</td>
<td>1076.26</td>
<td>1039.42</td>
<td>1139.28</td>
<td>1013.43</td>
<td>1017.19</td>
<td>1015.64</td>
<td>986.14</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1219.09</td>
<td>1200.87</td>
<td>1304.14</td>
<td>1107.21</td>
<td>1278.21</td>
<td>1285.28</td>
<td>1088.26</td>
<td>1128.9</td>
<td>1103.18</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1145.37</td>
<td>1124.2</td>
<td>1185.25</td>
<td>1072.85</td>
<td>1206.9</td>
<td>1142.46</td>
<td>1052.21</td>
<td>1070.95</td>
<td>1043.25</td>
</tr>
<tr>
<td>median</td>
<td>1147.93</td>
<td>1124.8</td>
<td>1250.59</td>
<td>1064.77</td>
<td>1246.5</td>
<td>1056.0</td>
<td>1042.31</td>
<td>1075.62</td>
<td>1014.24</td>
</tr>
<tr>
<td>first quartile</td>
<td>1147.68</td>
<td>1071.71</td>
<td>1093.25</td>
<td>1058.07</td>
<td>1212.52</td>
<td>1050.97</td>
<td>1028.16</td>
<td>1033.44</td>
<td>1011.22</td>
</tr>
<tr>
<td>third quartile</td>
<td>1183.23</td>
<td>1197.08</td>
<td>1272.09</td>
<td>1078.72</td>
<td>1247.23</td>
<td>1300.42</td>
<td>1053.4</td>
<td>1116.48</td>
<td>1076.86</td>
</tr>
<tr>
<td>minimum</td>
<td>1027.46</td>
<td>1028.81</td>
<td>1032.71</td>
<td>1034.81</td>
<td>1081.81</td>
<td>1029.58</td>
<td>1023.73</td>
<td>995.1</td>
<td>984.69</td>
</tr>
<tr>
<td>maximum</td>
<td>1230.73</td>
<td>1209.51</td>
<td>1302.35</td>
<td>1130.22</td>
<td>1255.66</td>
<td>1309.81</td>
<td>1116.01</td>
<td>1140.7</td>
<td>1136.29</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>262144</td><td>1223.05</td><td>1354.6</td><td>1309.34</td><td>1424.64</td><td>1454.58</td><td>1418.08</td><td>1317.96</td><td>1143.56</td><td>1319.54</td></tr>
<tr><td>262144</td><td>1421.07</td><td>1427.11</td><td>1349.0</td><td>1402.46</td><td>1236.63</td><td>1478.89</td><td>1302.35</td><td>1102.84</td><td>1109.41</td></tr>
<tr><td>262144</td><td>1361.61</td><td>1333.86</td><td>1337.34</td><td>1418.05</td><td>1341.42</td><td>1447.54</td><td>1328.34</td><td>1134.48</td><td>1246.31</td></tr>
<tr><td>262144</td><td>1383.07</td><td>1361.48</td><td>1343.87</td><td>1372.55</td><td>1386.84</td><td>1250.7</td><td>1258.35</td><td>1211.7</td><td>1171.39</td></tr>
<tr><td>262144</td><td>1479.29</td><td>1326.31</td><td>1358.82</td><td>1347.66</td><td>1347.32</td><td>1543.92</td><td>1346.4</td><td>1317.65</td><td>1170.32</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1373.62</td>
<td>1360.67</td>
<td>1339.67</td>
<td>1393.07</td>
<td>1353.36</td>
<td>1427.82</td>
<td>1310.68</td>
<td>1182.05</td>
<td>1203.39</td>
</tr>
<tr>
<td>standard dev.</td>
<td>95.29</td>
<td>39.85</td>
<td>18.69</td>
<td>32.37</td>
<td>79.33</td>
<td>109.48</td>
<td>33.35</td>
<td>85.56</td>
<td>81.06</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1282.77</td>
<td>1322.68</td>
<td>1321.86</td>
<td>1362.21</td>
<td>1277.72</td>
<td>1323.45</td>
<td>1278.88</td>
<td>1100.47</td>
<td>1126.11</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1464.47</td>
<td>1398.66</td>
<td>1357.49</td>
<td>1423.94</td>
<td>1428.99</td>
<td>1532.2</td>
<td>1342.47</td>
<td>1263.62</td>
<td>1280.68</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1370.89</td>
<td>1360.21</td>
<td>1339.57</td>
<td>1392.77</td>
<td>1351.47</td>
<td>1424.32</td>
<td>1310.33</td>
<td>1179.65</td>
<td>1201.24</td>
</tr>
<tr>
<td>median</td>
<td>1383.07</td>
<td>1354.6</td>
<td>1343.87</td>
<td>1402.46</td>
<td>1347.32</td>
<td>1447.54</td>
<td>1317.96</td>
<td>1143.56</td>
<td>1171.39</td>
</tr>
<tr>
<td>first quartile</td>
<td>1361.61</td>
<td>1333.86</td>
<td>1337.34</td>
<td>1372.55</td>
<td>1341.42</td>
<td>1418.08</td>
<td>1302.35</td>
<td>1134.48</td>
<td>1170.32</td>
</tr>
<tr>
<td>third quartile</td>
<td>1421.07</td>
<td>1361.48</td>
<td>1349.0</td>
<td>1418.05</td>
<td>1386.84</td>
<td>1478.89</td>
<td>1328.34</td>
<td>1211.7</td>
<td>1246.31</td>
</tr>
<tr>
<td>minimum</td>
<td>1223.05</td>
<td>1326.31</td>
<td>1309.34</td>
<td>1347.66</td>
<td>1236.63</td>
<td>1250.7</td>
<td>1258.35</td>
<td>1102.84</td>
<td>1109.41</td>
</tr>
<tr>
<td>maximum</td>
<td>1479.29</td>
<td>1427.11</td>
<td>1358.82</td>
<td>1424.64</td>
<td>1454.58</td>
<td>1543.92</td>
<td>1346.4</td>
<td>1317.65</td>
<td>1319.54</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>19.72 % </td>
<td>20.8 % </td>
<td>12.56 % </td>
<td>29.79 % </td>
<td>11.96 % </td>
<td>24.23 % </td>
<td>24.5 % </td>
<td>10.24 % </td>
<td>15.19 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0031</td>
<td>0.0003</td>
<td>0.0246</td>
<td>0.0</td>
<td>0.017</td>
<td>0.0085</td>
<td>0.0</td>
<td>0.0462</td>
<td>0.0082</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="524288"></a> 
<img src="524288.png" alt="524288" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>524288</td><td>1487.95</td><td>1358.27</td><td>1403.24</td><td>1368.5</td><td>1395.92</td><td>1517.91</td><td>1372.75</td><td>1310.98</td><td>1272.98</td></tr>
<tr><td>524288</td><td>1363.05</td><td>1419.8</td><td>1441.17</td><td>1347.45</td><td>1384.83</td><td>1331.79</td><td>1239.16</td><td>1278.33</td><td>1265.11</td></tr>
<tr><td>524288</td><td>1381.28</td><td>1416.54</td><td>1338.48</td><td>1538.97</td><td>1411.88</td><td>1355.47</td><td>1254.97</td><td>1173.88</td><td>1294.99</td></tr>
<tr><td>524288</td><td>1436.51</td><td>1494.04</td><td>1372.71</td><td>1448.21</td><td>1368.79</td><td>1425.44</td><td>1246.18</td><td>1302.45</td><td>1282.33</td></tr>
<tr><td>524288</td><td>1419.07</td><td>1340.51</td><td>1443.27</td><td>1527.48</td><td>1367.23</td><td>1305.8</td><td>1230.09</td><td>1252.09</td><td>1282.66</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1417.57</td>
<td>1405.83</td>
<td>1399.77</td>
<td>1446.12</td>
<td>1385.73</td>
<td>1387.28</td>
<td>1268.63</td>
<td>1263.55</td>
<td>1279.61</td>
</tr>
<tr>
<td>standard dev.</td>
<td>49.0</td>
<td>60.46</td>
<td>45.02</td>
<td>88.04</td>
<td>18.83</td>
<td>85.51</td>
<td>58.92</td>
<td>55.12</td>
<td>11.27</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1370.85</td>
<td>1348.19</td>
<td>1356.85</td>
<td>1362.18</td>
<td>1367.78</td>
<td>1305.75</td>
<td>1212.46</td>
<td>1210.99</td>
<td>1268.87</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1464.29</td>
<td>1463.47</td>
<td>1442.69</td>
<td>1530.06</td>
<td>1403.68</td>
<td>1468.81</td>
<td>1324.8</td>
<td>1316.1</td>
<td>1290.35</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1416.9</td>
<td>1404.8</td>
<td>1399.19</td>
<td>1443.97</td>
<td>1385.63</td>
<td>1385.22</td>
<td>1267.57</td>
<td>1262.56</td>
<td>1279.57</td>
</tr>
<tr>
<td>median</td>
<td>1419.07</td>
<td>1416.54</td>
<td>1403.24</td>
<td>1448.21</td>
<td>1384.83</td>
<td>1355.47</td>
<td>1246.18</td>
<td>1278.33</td>
<td>1282.33</td>
</tr>
<tr>
<td>first quartile</td>
<td>1381.28</td>
<td>1358.27</td>
<td>1372.71</td>
<td>1368.5</td>
<td>1368.79</td>
<td>1331.79</td>
<td>1239.16</td>
<td>1252.09</td>
<td>1272.98</td>
</tr>
<tr>
<td>third quartile</td>
<td>1436.51</td>
<td>1419.8</td>
<td>1441.17</td>
<td>1527.48</td>
<td>1395.92</td>
<td>1425.44</td>
<td>1254.97</td>
<td>1302.45</td>
<td>1282.66</td>
</tr>
<tr>
<td>minimum</td>
<td>1363.05</td>
<td>1340.51</td>
<td>1338.48</td>
<td>1347.45</td>
<td>1367.23</td>
<td>1305.8</td>
<td>1230.09</td>
<td>1173.88</td>
<td>1265.11</td>
</tr>
<tr>
<td>maximum</td>
<td>1487.95</td>
<td>1494.04</td>
<td>1443.27</td>
<td>1538.97</td>
<td>1411.88</td>
<td>1517.91</td>
<td>1372.75</td>
<td>1310.98</td>
<td>1294.99</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>524288</td><td>1524.77</td><td>1646.6</td><td>1531.16</td><td>1677.52</td><td>1674.63</td><td>1693.37</td><td>1391.36</td><td>1318.2</td><td>1315.2</td></tr>
<tr><td>524288</td><td>1518.75</td><td>1679.48</td><td>1473.44</td><td>1509.32</td><td>1644.73</td><td>1508.59</td><td>1444.7</td><td>1441.54</td><td>1427.22</td></tr>
<tr><td>524288</td><td>1729.95</td><td>1619.76</td><td>1724.68</td><td>1477.44</td><td>1755.07</td><td>1566.76</td><td>1520.13</td><td>1389.07</td><td>1315.79</td></tr>
<tr><td>524288</td><td>1498.01</td><td>1485.88</td><td>1469.46</td><td>1589.57</td><td>1611.37</td><td>1567.33</td><td>1424.23</td><td>1308.45</td><td>1403.04</td></tr>
<tr><td>524288</td><td>1724.56</td><td>1490.09</td><td>1605.12</td><td>1605.32</td><td>1496.99</td><td>1572.28</td><td>1544.43</td><td>1382.17</td><td>1418.57</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1599.21</td>
<td>1584.36</td>
<td>1560.77</td>
<td>1571.83</td>
<td>1636.56</td>
<td>1581.67</td>
<td>1464.97</td>
<td>1367.88</td>
<td>1375.96</td>
</tr>
<tr>
<td>standard dev.</td>
<td>117.32</td>
<td>90.5</td>
<td>106.86</td>
<td>79.72</td>
<td>94.44</td>
<td>67.7</td>
<td>64.9</td>
<td>54.95</td>
<td>55.88</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1487.35</td>
<td>1498.08</td>
<td>1458.89</td>
<td>1495.83</td>
<td>1546.52</td>
<td>1517.12</td>
<td>1403.1</td>
<td>1315.49</td>
<td>1322.69</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1711.06</td>
<td>1670.64</td>
<td>1662.65</td>
<td>1647.84</td>
<td>1726.6</td>
<td>1646.21</td>
<td>1526.84</td>
<td>1420.27</td>
<td>1429.24</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1595.82</td>
<td>1582.27</td>
<td>1557.92</td>
<td>1570.22</td>
<td>1634.35</td>
<td>1580.53</td>
<td>1463.83</td>
<td>1367.0</td>
<td>1375.05</td>
</tr>
<tr>
<td>median</td>
<td>1524.77</td>
<td>1619.76</td>
<td>1531.16</td>
<td>1589.57</td>
<td>1644.73</td>
<td>1567.33</td>
<td>1444.7</td>
<td>1382.17</td>
<td>1403.04</td>
</tr>
<tr>
<td>first quartile</td>
<td>1518.75</td>
<td>1490.09</td>
<td>1473.44</td>
<td>1509.32</td>
<td>1611.37</td>
<td>1566.76</td>
<td>1424.23</td>
<td>1318.2</td>
<td>1315.79</td>
</tr>
<tr>
<td>third quartile</td>
<td>1724.56</td>
<td>1646.6</td>
<td>1605.12</td>
<td>1605.32</td>
<td>1674.63</td>
<td>1572.28</td>
<td>1520.13</td>
<td>1389.07</td>
<td>1418.57</td>
</tr>
<tr>
<td>minimum</td>
<td>1498.01</td>
<td>1485.88</td>
<td>1469.46</td>
<td>1477.44</td>
<td>1496.99</td>
<td>1508.59</td>
<td>1391.36</td>
<td>1308.45</td>
<td>1315.2</td>
</tr>
<tr>
<td>maximum</td>
<td>1729.95</td>
<td>1679.48</td>
<td>1724.68</td>
<td>1677.52</td>
<td>1755.07</td>
<td>1693.37</td>
<td>1544.43</td>
<td>1441.54</td>
<td>1427.22</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>12.81 % </td>
<td>12.7 % </td>
<td>11.5 % </td>
<td>8.69 % </td>
<td>18.1 % </td>
<td>14.01 % </td>
<td>15.48 % </td>
<td>8.26 % </td>
<td>7.53 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0127</td>
<td>0.0063</td>
<td>0.0146</td>
<td>0.0455</td>
<td>0.0004</td>
<td>0.004</td>
<td>0.001</td>
<td>0.0171</td>
<td>0.0054</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="1048576"></a> 
<img src="1048576.png" alt="1048576" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>1048576</td><td>1657.86</td><td>1785.83</td><td>1800.01</td><td>1814.9</td><td>1679.07</td><td>1799.82</td><td>1527.06</td><td>1377.51</td><td>1461.99</td></tr>
<tr><td>1048576</td><td>1585.08</td><td>1619.35</td><td>1768.04</td><td>1565.51</td><td>1541.14</td><td>1667.5</td><td>1537.86</td><td>1295.57</td><td>1355.01</td></tr>
<tr><td>1048576</td><td>1578.25</td><td>1544.68</td><td>1768.11</td><td>1549.82</td><td>1666.06</td><td>1662.4</td><td>1366.74</td><td>1443.38</td><td>1442.62</td></tr>
<tr><td>1048576</td><td>1565.78</td><td>1651.91</td><td>1532.27</td><td>1754.57</td><td>1786.07</td><td>1769.76</td><td>1525.88</td><td>1368.12</td><td>1365.58</td></tr>
<tr><td>1048576</td><td>1612.15</td><td>1511.69</td><td>1722.11</td><td>1734.38</td><td>1767.66</td><td>1767.29</td><td>1506.4</td><td>1288.72</td><td>1357.71</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1599.82</td>
<td>1622.69</td>
<td>1718.11</td>
<td>1683.84</td>
<td>1688.0</td>
<td>1733.35</td>
<td>1492.79</td>
<td>1354.66</td>
<td>1396.58</td>
</tr>
<tr>
<td>standard dev.</td>
<td>36.61</td>
<td>107.11</td>
<td>107.53</td>
<td>119.06</td>
<td>97.59</td>
<td>63.77</td>
<td>71.37</td>
<td>64.06</td>
<td>51.47</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1564.91</td>
<td>1520.58</td>
<td>1615.58</td>
<td>1570.33</td>
<td>1594.96</td>
<td>1672.56</td>
<td>1424.74</td>
<td>1293.59</td>
<td>1347.51</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1634.73</td>
<td>1724.8</td>
<td>1820.63</td>
<td>1797.34</td>
<td>1781.04</td>
<td>1794.15</td>
<td>1560.83</td>
<td>1415.74</td>
<td>1445.65</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1599.49</td>
<td>1619.92</td>
<td>1715.28</td>
<td>1680.43</td>
<td>1685.7</td>
<td>1732.41</td>
<td>1491.36</td>
<td>1353.46</td>
<td>1395.83</td>
</tr>
<tr>
<td>median</td>
<td>1585.08</td>
<td>1619.35</td>
<td>1768.04</td>
<td>1734.38</td>
<td>1679.07</td>
<td>1767.29</td>
<td>1525.88</td>
<td>1368.12</td>
<td>1365.58</td>
</tr>
<tr>
<td>first quartile</td>
<td>1578.25</td>
<td>1544.68</td>
<td>1722.11</td>
<td>1565.51</td>
<td>1666.06</td>
<td>1667.5</td>
<td>1506.4</td>
<td>1295.57</td>
<td>1357.71</td>
</tr>
<tr>
<td>third quartile</td>
<td>1612.15</td>
<td>1651.91</td>
<td>1768.11</td>
<td>1754.57</td>
<td>1767.66</td>
<td>1769.76</td>
<td>1527.06</td>
<td>1377.51</td>
<td>1442.62</td>
</tr>
<tr>
<td>minimum</td>
<td>1565.78</td>
<td>1511.69</td>
<td>1532.27</td>
<td>1549.82</td>
<td>1541.14</td>
<td>1662.4</td>
<td>1366.74</td>
<td>1288.72</td>
<td>1355.01</td>
</tr>
<tr>
<td>maximum</td>
<td>1657.86</td>
<td>1785.83</td>
<td>1800.01</td>
<td>1814.9</td>
<td>1786.07</td>
<td>1799.82</td>
<td>1537.86</td>
<td>1443.38</td>
<td>1461.99</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>1048576</td><td>1762.82</td><td>1883.54</td><td>1762.37</td><td>1797.23</td><td>1974.82</td><td>1925.34</td><td>1617.53</td><td>1471.18</td><td>1493.61</td></tr>
<tr><td>1048576</td><td>1790.03</td><td>1888.38</td><td>1924.87</td><td>1764.46</td><td>1853.77</td><td>1796.15</td><td>1551.63</td><td>1503.81</td><td>1465.99</td></tr>
<tr><td>1048576</td><td>1744.02</td><td>1877.8</td><td>1913.57</td><td>1835.9</td><td>1949.78</td><td>1848.96</td><td>1648.26</td><td>1484.29</td><td>1490.39</td></tr>
<tr><td>1048576</td><td>1744.0</td><td>1833.33</td><td>1868.64</td><td>1821.17</td><td>1860.25</td><td>1753.54</td><td>1548.83</td><td>1511.56</td><td>1541.99</td></tr>
<tr><td>1048576</td><td>1864.74</td><td>1914.45</td><td>1901.27</td><td>1814.16</td><td>1843.17</td><td>1753.21</td><td>1624.04</td><td>1461.65</td><td>1451.74</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1781.12</td>
<td>1879.5</td>
<td>1874.14</td>
<td>1806.58</td>
<td>1896.36</td>
<td>1815.44</td>
<td>1598.06</td>
<td>1486.5</td>
<td>1488.74</td>
</tr>
<tr>
<td>standard dev.</td>
<td>50.4</td>
<td>29.38</td>
<td>65.93</td>
<td>27.35</td>
<td>61.15</td>
<td>72.93</td>
<td>45.15</td>
<td>21.13</td>
<td>34.46</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1733.07</td>
<td>1851.49</td>
<td>1811.29</td>
<td>1780.51</td>
<td>1838.06</td>
<td>1745.91</td>
<td>1555.02</td>
<td>1466.36</td>
<td>1455.89</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1829.18</td>
<td>1907.51</td>
<td>1937.0</td>
<td>1832.66</td>
<td>1954.65</td>
<td>1884.98</td>
<td>1641.1</td>
<td>1506.64</td>
<td>1521.59</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1780.56</td>
<td>1879.32</td>
<td>1873.19</td>
<td>1806.42</td>
<td>1895.57</td>
<td>1814.29</td>
<td>1597.55</td>
<td>1486.38</td>
<td>1488.43</td>
</tr>
<tr>
<td>median</td>
<td>1762.82</td>
<td>1883.54</td>
<td>1901.27</td>
<td>1814.16</td>
<td>1860.25</td>
<td>1796.15</td>
<td>1617.53</td>
<td>1484.29</td>
<td>1490.39</td>
</tr>
<tr>
<td>first quartile</td>
<td>1744.02</td>
<td>1877.8</td>
<td>1868.64</td>
<td>1797.23</td>
<td>1853.77</td>
<td>1753.54</td>
<td>1551.63</td>
<td>1471.18</td>
<td>1465.99</td>
</tr>
<tr>
<td>third quartile</td>
<td>1790.03</td>
<td>1888.38</td>
<td>1913.57</td>
<td>1821.17</td>
<td>1949.78</td>
<td>1848.96</td>
<td>1624.04</td>
<td>1503.81</td>
<td>1493.61</td>
</tr>
<tr>
<td>minimum</td>
<td>1744.0</td>
<td>1833.33</td>
<td>1762.37</td>
<td>1764.46</td>
<td>1843.17</td>
<td>1753.21</td>
<td>1548.83</td>
<td>1461.65</td>
<td>1451.74</td>
</tr>
<tr>
<td>maximum</td>
<td>1864.74</td>
<td>1914.45</td>
<td>1924.87</td>
<td>1835.9</td>
<td>1974.82</td>
<td>1925.34</td>
<td>1648.26</td>
<td>1511.56</td>
<td>1541.99</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>11.33 % </td>
<td>15.83 % </td>
<td>9.08 % </td>
<td>7.29 % </td>
<td>12.34 % </td>
<td>4.74 % </td>
<td>7.05 % </td>
<td>9.73 % </td>
<td>6.6 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0002</td>
<td>0.0009</td>
<td>0.0244</td>
<td>0.0548</td>
<td>0.0037</td>
<td>0.0948</td>
<td>0.0237</td>
<td>0.0024</td>
<td>0.0104</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="2097152"></a> 
<img src="2097152.png" alt="2097152" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>2097152</td><td>1662.45</td><td>1770.68</td><td>1811.8</td><td>1835.59</td><td>1811.77</td><td>1810.79</td><td>1565.66</td><td>1457.42</td><td>1449.95</td></tr>
<tr><td>2097152</td><td>1644.54</td><td>1757.94</td><td>1782.44</td><td>1791.65</td><td>1828.72</td><td>1775.28</td><td>1545.52</td><td>1438.83</td><td>1459.77</td></tr>
<tr><td>2097152</td><td>1800.31</td><td>1773.63</td><td>1803.64</td><td>1760.42</td><td>1806.07</td><td>1798.01</td><td>1514.42</td><td>1450.73</td><td>1451.06</td></tr>
<tr><td>2097152</td><td>1640.6</td><td>1780.02</td><td>1791.89</td><td>1799.07</td><td>1814.19</td><td>1776.44</td><td>1543.22</td><td>1445.04</td><td>1457.92</td></tr>
<tr><td>2097152</td><td>1661.37</td><td>1754.49</td><td>1765.54</td><td>1829.66</td><td>1822.97</td><td>1790.13</td><td>1561.88</td><td>1441.68</td><td>1450.51</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1681.86</td>
<td>1767.35</td>
<td>1791.06</td>
<td>1803.28</td>
<td>1816.74</td>
<td>1790.13</td>
<td>1546.14</td>
<td>1446.74</td>
<td>1453.84</td>
</tr>
<tr>
<td>standard dev.</td>
<td>66.94</td>
<td>10.78</td>
<td>18.13</td>
<td>30.54</td>
<td>9.05</td>
<td>14.97</td>
<td>20.27</td>
<td>7.43</td>
<td>4.63</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1618.04</td>
<td>1757.07</td>
<td>1773.78</td>
<td>1774.16</td>
<td>1808.12</td>
<td>1775.86</td>
<td>1526.82</td>
<td>1439.65</td>
<td>1449.43</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1745.67</td>
<td>1777.63</td>
<td>1808.35</td>
<td>1832.39</td>
<td>1825.37</td>
<td>1804.41</td>
<td>1565.47</td>
<td>1453.82</td>
<td>1458.26</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1680.83</td>
<td>1767.33</td>
<td>1790.99</td>
<td>1803.07</td>
<td>1816.73</td>
<td>1790.08</td>
<td>1546.04</td>
<td>1446.72</td>
<td>1453.84</td>
</tr>
<tr>
<td>median</td>
<td>1661.37</td>
<td>1770.68</td>
<td>1791.89</td>
<td>1799.07</td>
<td>1814.19</td>
<td>1790.13</td>
<td>1545.52</td>
<td>1445.04</td>
<td>1451.06</td>
</tr>
<tr>
<td>first quartile</td>
<td>1644.54</td>
<td>1757.94</td>
<td>1782.44</td>
<td>1791.65</td>
<td>1811.77</td>
<td>1776.44</td>
<td>1543.22</td>
<td>1441.68</td>
<td>1450.51</td>
</tr>
<tr>
<td>third quartile</td>
<td>1662.45</td>
<td>1773.63</td>
<td>1803.64</td>
<td>1829.66</td>
<td>1822.97</td>
<td>1798.01</td>
<td>1561.88</td>
<td>1450.73</td>
<td>1457.92</td>
</tr>
<tr>
<td>minimum</td>
<td>1640.6</td>
<td>1754.49</td>
<td>1765.54</td>
<td>1760.42</td>
<td>1806.07</td>
<td>1775.28</td>
<td>1514.42</td>
<td>1438.83</td>
<td>1449.95</td>
</tr>
<tr>
<td>maximum</td>
<td>1800.31</td>
<td>1780.02</td>
<td>1811.8</td>
<td>1835.59</td>
<td>1828.72</td>
<td>1810.79</td>
<td>1565.66</td>
<td>1457.42</td>
<td>1459.77</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>2097152</td><td>1940.49</td><td>1929.43</td><td>2019.28</td><td>2037.47</td><td>1952.38</td><td>1942.67</td><td>1740.45</td><td>1575.57</td><td>1594.65</td></tr>
<tr><td>2097152</td><td>1979.65</td><td>1928.13</td><td>2082.09</td><td>2024.85</td><td>2079.96</td><td>2107.19</td><td>1773.13</td><td>1591.65</td><td>1566.63</td></tr>
<tr><td>2097152</td><td>1923.98</td><td>1946.83</td><td>2090.31</td><td>2037.05</td><td>2035.28</td><td>2040.08</td><td>1689.35</td><td>1602.1</td><td>1585.48</td></tr>
<tr><td>2097152</td><td>1952.22</td><td>1946.61</td><td>1939.06</td><td>2017.04</td><td>2054.33</td><td>2048.49</td><td>1689.65</td><td>1568.95</td><td>1574.33</td></tr>
<tr><td>2097152</td><td>1991.2</td><td>1952.06</td><td>1955.23</td><td>2169.82</td><td>2158.5</td><td>1921.27</td><td>1710.56</td><td>1567.97</td><td>1595.07</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1957.51</td>
<td>1940.61</td>
<td>2017.19</td>
<td>2057.25</td>
<td>2056.09</td>
<td>2011.94</td>
<td>1720.63</td>
<td>1581.25</td>
<td>1583.23</td>
</tr>
<tr>
<td>standard dev.</td>
<td>27.69</td>
<td>11.03</td>
<td>69.83</td>
<td>63.52</td>
<td>74.58</td>
<td>77.81</td>
<td>36.02</td>
<td>15.02</td>
<td>12.56</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1931.11</td>
<td>1930.1</td>
<td>1950.62</td>
<td>1996.69</td>
<td>1984.99</td>
<td>1937.75</td>
<td>1686.29</td>
<td>1566.92</td>
<td>1571.26</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1983.91</td>
<td>1951.13</td>
<td>2083.77</td>
<td>2117.8</td>
<td>2127.2</td>
<td>2086.13</td>
<td>1754.97</td>
<td>1595.57</td>
<td>1595.2</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1957.35</td>
<td>1940.59</td>
<td>2016.23</td>
<td>2056.48</td>
<td>2055.01</td>
<td>2010.73</td>
<td>1720.33</td>
<td>1581.19</td>
<td>1583.19</td>
</tr>
<tr>
<td>median</td>
<td>1952.22</td>
<td>1946.61</td>
<td>2019.28</td>
<td>2037.05</td>
<td>2054.33</td>
<td>2040.08</td>
<td>1710.56</td>
<td>1575.57</td>
<td>1585.48</td>
</tr>
<tr>
<td>first quartile</td>
<td>1940.49</td>
<td>1929.43</td>
<td>1955.23</td>
<td>2024.85</td>
<td>2035.28</td>
<td>1942.67</td>
<td>1689.65</td>
<td>1568.95</td>
<td>1574.33</td>
</tr>
<tr>
<td>third quartile</td>
<td>1979.65</td>
<td>1946.83</td>
<td>2082.09</td>
<td>2037.47</td>
<td>2079.96</td>
<td>2048.49</td>
<td>1740.45</td>
<td>1591.65</td>
<td>1594.65</td>
</tr>
<tr>
<td>minimum</td>
<td>1923.98</td>
<td>1928.13</td>
<td>1939.06</td>
<td>2017.04</td>
<td>1952.38</td>
<td>1921.27</td>
<td>1689.35</td>
<td>1567.97</td>
<td>1566.63</td>
</tr>
<tr>
<td>maximum</td>
<td>1991.2</td>
<td>1952.06</td>
<td>2090.31</td>
<td>2169.82</td>
<td>2158.5</td>
<td>2107.19</td>
<td>1773.13</td>
<td>1602.1</td>
<td>1595.07</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>16.39 % </td>
<td>9.8 % </td>
<td>12.63 % </td>
<td>14.08 % </td>
<td>13.17 % </td>
<td>12.39 % </td>
<td>11.29 % </td>
<td>9.3 % </td>
<td>8.9 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0001</td>
<td>0.0</td>
<td>0.0001</td>
<td>0.0002</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="4194304"></a> 
<img src="4194304.png" alt="4194304" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>4194304</td><td>1719.39</td><td>1696.42</td><td>1706.88</td><td>1745.58</td><td>1752.88</td><td>1728.13</td><td>1506.26</td><td>1387.43</td><td>1405.85</td></tr>
<tr><td>4194304</td><td>1698.16</td><td>1680.29</td><td>1695.58</td><td>1732.54</td><td>1731.22</td><td>1734.39</td><td>1508.59</td><td>1393.93</td><td>1394.86</td></tr>
<tr><td>4194304</td><td>1679.75</td><td>1705.32</td><td>1727.87</td><td>1728.78</td><td>1734.6</td><td>1725.56</td><td>1492.68</td><td>1407.43</td><td>1387.49</td></tr>
<tr><td>4194304</td><td>1691.64</td><td>1712.72</td><td>1715.31</td><td>1725.29</td><td>1736.76</td><td>1716.87</td><td>1510.01</td><td>1405.22</td><td>1400.0</td></tr>
<tr><td>4194304</td><td>1661.86</td><td>1676.19</td><td>1715.64</td><td>1706.65</td><td>1702.87</td><td>1710.94</td><td>1495.24</td><td>1391.93</td><td>1374.14</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1690.16</td>
<td>1694.19</td>
<td>1712.26</td>
<td>1727.77</td>
<td>1731.66</td>
<td>1723.18</td>
<td>1502.56</td>
<td>1397.19</td>
<td>1392.47</td>
</tr>
<tr>
<td>standard dev.</td>
<td>21.39</td>
<td>15.73</td>
<td>11.95</td>
<td>14.08</td>
<td>18.12</td>
<td>9.3</td>
<td>8.01</td>
<td>8.7</td>
<td>12.27</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1669.77</td>
<td>1679.19</td>
<td>1700.86</td>
<td>1714.34</td>
<td>1714.38</td>
<td>1714.32</td>
<td>1494.92</td>
<td>1388.89</td>
<td>1380.77</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1710.55</td>
<td>1709.18</td>
<td>1723.65</td>
<td>1741.19</td>
<td>1748.94</td>
<td>1732.04</td>
<td>1510.2</td>
<td>1405.48</td>
<td>1404.17</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1690.05</td>
<td>1694.13</td>
<td>1712.22</td>
<td>1727.72</td>
<td>1731.59</td>
<td>1723.16</td>
<td>1502.54</td>
<td>1397.17</td>
<td>1392.42</td>
</tr>
<tr>
<td>median</td>
<td>1691.64</td>
<td>1696.42</td>
<td>1715.31</td>
<td>1728.78</td>
<td>1734.6</td>
<td>1725.56</td>
<td>1506.26</td>
<td>1393.93</td>
<td>1394.86</td>
</tr>
<tr>
<td>first quartile</td>
<td>1679.75</td>
<td>1680.29</td>
<td>1706.88</td>
<td>1725.29</td>
<td>1731.22</td>
<td>1716.87</td>
<td>1495.24</td>
<td>1391.93</td>
<td>1387.49</td>
</tr>
<tr>
<td>third quartile</td>
<td>1698.16</td>
<td>1705.32</td>
<td>1715.64</td>
<td>1732.54</td>
<td>1736.76</td>
<td>1728.13</td>
<td>1508.59</td>
<td>1405.22</td>
<td>1400.0</td>
</tr>
<tr>
<td>minimum</td>
<td>1661.86</td>
<td>1676.19</td>
<td>1695.58</td>
<td>1706.65</td>
<td>1702.87</td>
<td>1710.94</td>
<td>1492.68</td>
<td>1387.43</td>
<td>1374.14</td>
</tr>
<tr>
<td>maximum</td>
<td>1719.39</td>
<td>1712.72</td>
<td>1727.87</td>
<td>1745.58</td>
<td>1752.88</td>
<td>1734.39</td>
<td>1510.01</td>
<td>1407.43</td>
<td>1405.85</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>4194304</td><td>1953.75</td><td>1991.78</td><td>1990.38</td><td>2002.98</td><td>2042.46</td><td>2045.61</td><td>1704.65</td><td>1556.63</td><td>1577.6</td></tr>
<tr><td>4194304</td><td>2004.71</td><td>2019.13</td><td>1981.35</td><td>1991.47</td><td>2042.25</td><td>2009.55</td><td>1698.86</td><td>1575.67</td><td>1583.19</td></tr>
<tr><td>4194304</td><td>1982.65</td><td>1988.54</td><td>2023.63</td><td>2046.01</td><td>2005.78</td><td>1985.65</td><td>1713.7</td><td>1572.52</td><td>1568.9</td></tr>
<tr><td>4194304</td><td>1965.53</td><td>1984.17</td><td>1999.14</td><td>1990.55</td><td>2025.16</td><td>2005.21</td><td>1710.7</td><td>1566.13</td><td>1582.62</td></tr>
<tr><td>4194304</td><td>2030.52</td><td>1997.63</td><td>2003.71</td><td>1980.65</td><td>2003.29</td><td>1999.49</td><td>1750.57</td><td>1591.18</td><td>1567.13</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1987.43</td>
<td>1996.25</td>
<td>1999.64</td>
<td>2002.33</td>
<td>2023.79</td>
<td>2009.1</td>
<td>1715.69</td>
<td>1572.43</td>
<td>1575.89</td>
</tr>
<tr>
<td>standard dev.</td>
<td>30.79</td>
<td>13.7</td>
<td>15.91</td>
<td>25.66</td>
<td>18.95</td>
<td>22.31</td>
<td>20.32</td>
<td>12.76</td>
<td>7.53</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1958.08</td>
<td>1983.19</td>
<td>1984.47</td>
<td>1977.86</td>
<td>2005.72</td>
<td>1987.83</td>
<td>1696.32</td>
<td>1560.26</td>
<td>1568.71</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>2016.79</td>
<td>2009.31</td>
<td>2014.81</td>
<td>2026.8</td>
<td>2041.85</td>
<td>2030.37</td>
<td>1735.06</td>
<td>1584.59</td>
<td>1583.07</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1987.24</td>
<td>1996.21</td>
<td>1999.59</td>
<td>2002.2</td>
<td>2023.72</td>
<td>2009.0</td>
<td>1715.6</td>
<td>1572.39</td>
<td>1575.87</td>
</tr>
<tr>
<td>median</td>
<td>1982.65</td>
<td>1991.78</td>
<td>1999.14</td>
<td>1991.47</td>
<td>2025.16</td>
<td>2005.21</td>
<td>1710.7</td>
<td>1572.52</td>
<td>1577.6</td>
</tr>
<tr>
<td>first quartile</td>
<td>1965.53</td>
<td>1988.54</td>
<td>1990.38</td>
<td>1990.55</td>
<td>2005.78</td>
<td>1999.49</td>
<td>1704.65</td>
<td>1566.13</td>
<td>1568.9</td>
</tr>
<tr>
<td>third quartile</td>
<td>2004.71</td>
<td>1997.63</td>
<td>2003.71</td>
<td>2002.98</td>
<td>2042.25</td>
<td>2009.55</td>
<td>1713.7</td>
<td>1575.67</td>
<td>1582.62</td>
</tr>
<tr>
<td>minimum</td>
<td>1953.75</td>
<td>1984.17</td>
<td>1981.35</td>
<td>1980.65</td>
<td>2003.29</td>
<td>1985.65</td>
<td>1698.86</td>
<td>1556.63</td>
<td>1567.13</td>
</tr>
<tr>
<td>maximum</td>
<td>2030.52</td>
<td>2019.13</td>
<td>2023.63</td>
<td>2046.01</td>
<td>2042.46</td>
<td>2045.61</td>
<td>1750.57</td>
<td>1591.18</td>
<td>1583.19</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>17.59 % </td>
<td>17.83 % </td>
<td>16.78 % </td>
<td>15.89 % </td>
<td>16.87 % </td>
<td>16.59 % </td>
<td>14.19 % </td>
<td>12.54 % </td>
<td>13.17 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>

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